1-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 40° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan biri qiymati bo‘yicha qolgan sin πΌ qiymatini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: πππ 630° − π ππ 1470° − ππ‘π1125°; 5. Hisoblang arcsin 1 3 ο« arcsin 2 2 6. y ο½ 5 ο ο°arcctgx qiymatlar sohasini toping √2 7. Tenglamani yeching πππ π₯ = 2 ; ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· . ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· 1 3 1 10. Determenantni hisoblang. 1 3 3 ; 1 3 6 2-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 65° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: sin πΌ = 0,8 π£π πΌ < π; 4. Ifodaning son qiymatini toping: π ππ 630° − π ππ 1470° − π‘π1125°; ο¦ 5. Hisoblang arcsinο§ο§ ο ο¨ 3οΆ 1 ο·ο· ο« arcsinο¦ο§ ο οΆο· 2 οΈ ο¨ 2οΈ 6. y ο½ 2 ο 3arcctgx qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 2 ; π 2 < ο¦ 5 8 ο 4οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· . ο§ 9 6 5ο· ο¨ οΈ ο¦ 5 8 ο 4οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ 10. Determenantni hisoblang. 1 1 1 2 2 2; ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· ο§ 9 6 5ο· ο¨ οΈ 11 3 6 3-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 84° 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2π 9 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: 15 3π tgπΌ = 8 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 180° − π ππ 150° − ππ‘π150°; ο¦ ο¦ 1 οΆοΆ ο·ο· ο¨ 5 οΈοΈ 5. Hisoblang sin ο§ arcsin ο§ ο ο¨ 6. y ο½ 2 ο« arcctgx qiymatlar sohasini toping. π₯ 7.Tenglamani yeching √2sin 3 = −1 ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· . 8. Matritsalarning qo’shing topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ 10. Determenantni hisoblang. 4 4 4 2 2 2; 1 -3 6 4-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 85° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3.Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ qiymatni toping: 7 3π ctg πΌ = 24 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 90° − ππ‘π2255°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ arctgx ο 2 qiymatlar sohasini toping. 1 7. Tenglamani yeching π ππ π₯ = − 4 ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· . ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ 84 64 1 10. Determenantni hisoblang. 2 2 2; 6 6 6 5-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 60° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: π tg πΌ =-2,4 va 2 < πΌ < π 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 60° − ππ‘π240°; ο¦ 2οΆ ο¦ 1οΆ ο·ο· ο· ο arcsinο§ο§ ο 2 ο¨ 2οΈ ο¨ οΈ 5. Hisoblang arccosο§ ο 6. y ο½ 2 ο« arctgx qiymatlar sohasini toping. 7. Tenglamani yeching tgπ₯ = 1 √3 ο¦1 2 8. Matritsalarning qo’shing topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ ο¦1 2 9. Matritsalarning ko’paytmasi topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 84 64 -19 10. Determenantni hisoblang. 2 2 2 ; 6 6 6 ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ 2οΆ ο· 0ο· 1ο·οΈ .Π²Π° ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 2οΆ ο· 0ο· 1ο·οΈ ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ Π²Π° 1 2 3 ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ 1οΆ ο· 2ο· 3 ο·οΈ 1 2 3 1οΆ ο· 2ο· 3 ο·οΈ 6-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 0° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 4 3. Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ,qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: ππ‘π 630° − πππ 1470° − π‘π1125°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 3 ο« 2 arcsinο¨2 ο x ο© funksiyaning aniqlanish sohasini toping. 7. Tenglamani yeching tgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 6 6 12 ; 6 7-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 80° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 5 3. Trigonometrik funktsiyalardan qiymati bo‘yicha ctg πΌ qiymatlarini toping: π cos = 0,8 π£π 0 < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 120° − π ππ 45° − ππ‘π135°; ο¦ ο¨ 1οΆ 3οΈ 5. Hisoblang sin ο§ 2 arccos ο· 6. y ο½ 2 ο arcsin x qiymatlar sohasini toping. 7. Tenglamani yechingπtgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 1 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· 1 1ο· ο§ ο§ 0 1 0ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 0 84 64 -19 10. Determenantni hisoblang. 12 12 26 26 12 ; 26 8-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 82° 7π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − π ππ 150° − ππ‘π135°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 1ο arccos x qiymatlar sohasini toping. π₯ 7. Tenglamani yeching √3 + tg 6 = 0 ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 9-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 324° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 3 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − πππ 2250° − ππ‘π180°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ ο¦ 2οΆ 3οΆ ο·ο· ο arcsinο§ο§ ο ο·ο· 2 οΈ 2 ο¨ οΈ 6. y ο½ 2 ο« arcsin x qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 3 . ο¦1 0 0οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 4 1ο· ο§ ο§ 0 1 0ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦1 0 0οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 10-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 110° 9π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: π cos πΌ = 0,8 π£π 0 < πΌ < 2 4. Ifodaning son qiymatini toping: π ππ 60° − π ππ 90° − ππ‘π135°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ 2 ο« 5arcsin x qiymatlar sohasini toping. 7.Tenglamani yeching π ππ π₯ = − 1 √2 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 112 112 112 ; 26 26 26 11-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 40° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan biri qiymati bo‘yicha qolgan sin πΌ qiymatini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: πππ 630° − π ππ 1470° − ππ‘π1125°; 5. Hisoblang arcsin 1 3 ο« arcsin 2 2 6. y ο½ 5 ο ο°arcctgx qiymatlar sohasini toping √2 7. Tenglamani yeching πππ π₯ = 2 ; ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· . ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· 1 3 1 10. Determenantni hisoblang. 1 3 3 ; 1 3 6 12-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 65° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: sin πΌ = 0,8 π£π πΌ < π; 4. Ifodaning son qiymatini toping: π ππ 630° − π ππ 1470° − π‘π1125°; ο¦ 5. Hisoblang arcsinο§ο§ ο ο¨ 3οΆ 1 ο·ο· ο« arcsinο¦ο§ ο οΆο· 2 οΈ ο¨ 2οΈ 6. y ο½ 2 ο 3arcctgx qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 2 ; π 2 < ο¦ 5 8 ο 4οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ ο¦ 5 8 ο 4οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ 10. Determenantni hisoblang. 1 1 1 2 2 2; ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· . ο§ 9 6 5ο· ο¨ οΈ ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· ο§ 9 6 5ο· ο¨ οΈ 11 3 6 13-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 84° 2π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 9 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: 15 3π tgπΌ = 8 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 180° − π ππ 150° − ππ‘π150°; ο¦ ο¦ 1 οΆοΆ ο·ο· ο¨ 5 οΈοΈ 5. Hisoblang sin ο§ arcsin ο§ ο ο¨ 6. y ο½ 2 ο« arcctgx qiymatlar sohasini toping. π₯ 7.Tenglamani yeching √2sin 3 = −1 ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· . 8. Matritsalarning qo’shing topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ 10. Determenantni hisoblang. 4 4 4 2 2 2; 1 -3 6 14-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 85° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3.Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ qiymatni toping: 7 3π ctg πΌ = 24 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 90° − ππ‘π2255°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ arctgx ο 2 qiymatlar sohasini toping. 1 7. Tenglamani yeching π ππ π₯ = − 4 ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· . ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ 84 64 1 10. Determenantni hisoblang. 2 2 2; 6 6 6 15-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 60° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: π tg πΌ =-2,4 va 2 < πΌ < π 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 60° − ππ‘π240°; ο¦ 2οΆ ο¦ 1οΆ ο·ο· ο· ο arcsinο§ο§ ο 2 ο¨ 2οΈ ο¨ οΈ 5. Hisoblang arccosο§ ο 6. y ο½ 2 ο« arctgx qiymatlar sohasini toping. 7. Tenglamani yeching tgπ₯ = 1 √3 ο¦1 2 8. Matritsalarning qo’shing topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ ο¦1 2 9. Matritsalarning ko’paytmasi topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ 2οΆ ο· 0ο· 1ο·οΈ .Π²Π° ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 2οΆ ο· 0ο· 1ο·οΈ ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ Π²Π° 1 2 3 ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ 1οΆ ο· 2ο· 3 ο·οΈ 1 2 3 1οΆ ο· 2ο· 3 ο·οΈ 84 64 -19 10. Determenantni hisoblang. 2 2 2 ; 6 6 6 16-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 0° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 4 3. Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ,qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: ππ‘π 630° − πππ 1470° − π‘π1125°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 3 ο« 2 arcsinο¨2 ο x ο© funksiyaning aniqlanish sohasini toping. 7. Tenglamani yeching tgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 6 6 12 ; 6 17-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 80° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 5 3. Trigonometrik funktsiyalardan qiymati bo‘yicha ctg πΌ qiymatlarini toping: π cos = 0,8 π£π 0 < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 120° − π ππ 45° − ππ‘π135°; ο¦ ο¨ 1οΆ 3οΈ 5. Hisoblang sin ο§ 2 arccos ο· 6. y ο½ 2 ο arcsin x qiymatlar sohasini toping. 7. Tenglamani yechingπtgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 1 1ο· ο§ ο§ 0 1 0ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 26 26 12 ; 26 18-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 82° 7π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − π ππ 150° − ππ‘π135°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 1ο arccos x qiymatlar sohasini toping. π₯ 7. Tenglamani yeching √3 + tg 6 = 0 ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 19-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 324° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 3 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − πππ 2250° − ππ‘π180°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ ο¦ 2οΆ 3οΆ ο·ο· ο arcsinο§ο§ ο ο·ο· 2 οΈ 2 ο¨ οΈ 6. y ο½ 2 ο« arcsin x qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 3 . ο¦1 0 0οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦1 0 0οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· 4 1ο· ο§ ο§ 0 1 0ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 0 184 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 20-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 110° 9π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: π cos πΌ = 0,8 π£π 0 < πΌ < 2 4. Ifodaning son qiymatini toping: π ππ 60° − π ππ 90° − ππ‘π135°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ 2 ο« 5arcsin x qiymatlar sohasini toping. 7.Tenglamani yeching π ππ π₯ = − 1 √2 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 1 0ο· ο§ ο§0 1 0ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 112 112 112 ; 26 26 26 21-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 40° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan biri qiymati bo‘yicha qolgan sin πΌ qiymatini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: πππ 630° − π ππ 1470° − ππ‘π1125°; 5. Hisoblang arcsin 1 3 ο« arcsin 2 2 6. y ο½ 5 ο ο°arcctgx qiymatlar sohasini toping √2 7. Tenglamani yeching πππ π₯ = 2 ; ο¦1 0 2οΆ ο¦ 6 2 6οΆ ο§ ο· ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· . ο§0 2 0ο· ο§ 3 6 3ο· ο¨ οΈ ο¨ οΈ ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· 1 3 1 10. Determenantni hisoblang. 1 3 3 ; 1 3 6 22-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 65° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: sin πΌ = 0,8 π£π πΌ < π; 4. Ifodaning son qiymatini toping: π ππ 630° − π ππ 1470° − π‘π1125°; ο¦ 5. Hisoblang arcsinο§ο§ ο ο¨ 3οΆ 1 ο·ο· ο« arcsinο¦ο§ ο οΆο· 2 οΈ ο¨ 2οΈ 6. y ο½ 2 ο 3arcctgx qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 2 ; ο¦ 5 8 ο 4οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ ο¦ 5 8 ο 4οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ 10. Determenantni hisoblang. 1 1 1 2 2 2; ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· . ο§ 9 6 5ο· ο¨ οΈ ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· ο§ 9 6 5ο· ο¨ οΈ 11 3 6 23-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 84° 2π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 9 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: 15 3π tgπΌ = 8 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 180° − π ππ 150° − ππ‘π150°; ο¦ ο¦ 1 οΆοΆ ο·ο· ο¨ 5 οΈοΈ 5. Hisoblang sin ο§ arcsin ο§ ο ο¨ 6. y ο½ 2 ο« arcctgx qiymatlar sohasini toping. π₯ 7.Tenglamani yeching √2sin 3 = −1 ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· . 8. Matritsalarning qo’shing topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ π 2 < ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ 10. Determenantni hisoblang. 4 4 4 2 2 2; 1 -3 6 24-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 85° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3.Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ qiymatni toping: 7 3π ctg πΌ = 24 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 90° − ππ‘π2255°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ arctgx ο 2 qiymatlar sohasini toping. 1 7. Tenglamani yeching π ππ π₯ = − 4 ο¦1 - 1 0 οΆ ο§ ο· ο¦ ο 2 1 2οΆ ο§ ο· ο§3 ο1 2ο· ο¨ οΈ ο§2 ο 3 7 ο· ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· . ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ 84 64 1 10. Determenantni hisoblang. 2 2 2; 6 6 6 25-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 60° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: π tg πΌ =-2,4 va 2 < πΌ < π 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 60° − ππ‘π240°; ο¦ 2οΆ ο¦ 1οΆ ο·ο· ο· ο arcsinο§ο§ ο 2 ο¨ 2οΈ ο¨ οΈ 5. Hisoblang arccosο§ ο 6. y ο½ 2 ο« arctgx qiymatlar sohasini toping. 7. Tenglamani yeching tgπ₯ = 1 √3 ο¦1 2 8. Matritsalarning qo’shing topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ ο¦1 2 9. Matritsalarning ko’paytmasi topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ 2οΆ ο· 0ο· 1ο·οΈ .Π²Π° ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 2οΆ ο· 0ο· 1ο·οΈ ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ Π²Π° 84 64 -19 10. Determenantni hisoblang. 2 2 2 ; 6 6 6 26-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 0° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 4 3. Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ,qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: ππ‘π 630° − πππ 1470° − π‘π1125°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 3 ο« 2 arcsinο¨2 ο x ο© funksiyaning aniqlanish sohasini toping. 7. Tenglamani yeching tgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 1 1ο· ο§ ο§0 1 0ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 2 ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 6 6 12 ; 6 1 2 3 ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ 1οΆ ο· 2ο· 3 ο·οΈ 1 2 3 1οΆ ο· 2ο· 3 ο·οΈ 27-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 80° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 5 3. Trigonometrik funktsiyalardan qiymati bo‘yicha ctg πΌ qiymatlarini toping: π cos = 0,8 π£π 0 < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 120° − π ππ 45° − ππ‘π135°; ο¦ ο¨ 1οΆ 3οΈ 5. Hisoblang sin ο§ 2 arccos ο· 6. y ο½ 2 ο arcsin x qiymatlar sohasini toping. 7. Tenglamani yechingπtgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 1 1ο· ο§ ο§ 0 1 0ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 26 26 12 ; 26 28-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 82° 7π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − π ππ 150° − ππ‘π135°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 1ο arccos x qiymatlar sohasini toping. π₯ 7. Tenglamani yeching √3 + tg 6 = 0 ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 4 1ο· ο§ ο§ 0 1 0ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 29-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 324° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 3 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − πππ 2250° − ππ‘π180°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ ο¦ 2οΆ 3οΆ ο·ο· ο arcsinο§ο§ ο ο·ο· 2 οΈ 2 ο¨ οΈ 6. y ο½ 2 ο« arcsin x qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 3 . ο¦1 0 0οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦1 0 0οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 30-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 110° 9π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: π cos πΌ = 0,8 π£π 0 < πΌ < 2 4. Ifodaning son qiymatini toping: π ππ 60° − π ππ 90° − ππ‘π135°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ 2 ο« 5arcsin x qiymatlar sohasini toping. 7.Tenglamani yeching π ππ π₯ = − 1 √2 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 1 0ο· ο§ ο§0 1 0ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 112 112 112 ; 26 26 26 31-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 40° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan biri qiymati bo‘yicha qolgan sin πΌ qiymatini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: πππ 630° − π ππ 1470° − ππ‘π1125°; 5. Hisoblang arcsin 1 3 ο« arcsin 2 2 6. y ο½ 5 ο ο°arcctgx qiymatlar sohasini toping √2 7. Tenglamani yeching πππ π₯ = 2 ; ο¦1 0 2οΆ ο¦ 6 2 6οΆ ο§ ο· ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· . ο§0 2 0ο· ο§ 3 6 3ο· ο¨ οΈ ο¨ οΈ ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· 1 3 1 10. Determenantni hisoblang. 1 3 3 ; 1 3 6 32-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 65° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: sin πΌ = 0,8 π£π πΌ < π; 4. Ifodaning son qiymatini toping: π ππ 630° − π ππ 1470° − π‘π1125°; ο¦ 5. Hisoblang arcsinο§ο§ ο ο¨ 3οΆ 1 ο·ο· ο« arcsinο¦ο§ ο οΆο· 2 οΈ ο¨ 2οΈ 6. y ο½ 2 ο 3arcctgx qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 2 ; ο¦ 5 8 ο 4οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ ο¦ 5 8 ο 4οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ 10. Determenantni hisoblang. 1 1 1 2 2 2; ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· . ο§ 9 6 5ο· ο¨ οΈ ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· ο§ 9 6 5ο· ο¨ οΈ 11 3 6 33-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 84° 2π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 9 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: π 2 < 15 3π tgπΌ = 8 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 180° − π ππ 150° − ππ‘π150°; ο¦ ο¦ 1 οΆοΆ ο·ο· ο¨ 5 οΈοΈ 5. Hisoblang sin ο§ arcsin ο§ ο ο¨ 6. y ο½ 2 ο« arcctgx qiymatlar sohasini toping. π₯ 7.Tenglamani yeching √2sin 3 = −1 ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· . 8. Matritsalarning qo’shing topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ 10. Determenantni hisoblang. 4 4 4 2 2 2; 1 -3 6 34-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 85° 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 3π 2 3.Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ qiymatni toping: 7 3π ctg πΌ = 24 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 90° − ππ‘π2255°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ arctgx ο 2 qiymatlar sohasini toping. 7. Tenglamani yeching π ππ π₯ = − 1 4 ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· . ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ 84 64 1 10. Determenantni hisoblang. 2 2 2; 6 6 6 35-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 60° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: π tg πΌ =-2,4 va 2 < πΌ < π 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 60° − ππ‘π240°; ο¦ 2οΆ ο¦ 1οΆ ο·ο· ο· ο arcsinο§ο§ ο 2 ο¨ 2οΈ ο¨ οΈ 5. Hisoblang arccosο§ ο 6. y ο½ 2 ο« arctgx qiymatlar sohasini toping. 7. Tenglamani yeching tgπ₯ = 1 √3 ο¦1 2 8. Matritsalarning qo’shing topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ ο¦1 2 9. Matritsalarning ko’paytmasi topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ 2οΆ ο· 0ο· 1ο·οΈ .Π²Π° ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 2οΆ ο· 0ο· 1ο·οΈ ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ Π²Π° 84 64 -19 10. Determenantni hisoblang. 2 2 2 ; 6 6 6 36-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 0° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 4 3. Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ,qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: ππ‘π 630° − πππ 1470° − π‘π1125°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 1 2 3 ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ 1οΆ ο· 2ο· 3 ο·οΈ 1 2 3 1οΆ ο· 2ο· 3 ο·οΈ 6. y ο½ 3 ο« 2 arcsinο¨2 ο x ο© funksiyaning aniqlanish sohasini toping. 7. Tenglamani yeching tgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 6 6 12 ; 6 37-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 80° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 5 3. Trigonometrik funktsiyalardan qiymati bo‘yicha ctg πΌ qiymatlarini toping: π cos = 0,8 π£π 0 < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 120° − π ππ 45° − ππ‘π135°; ο¦ ο¨ 1οΆ 3οΈ 5. Hisoblang sin ο§ 2 arccos ο· 6. y ο½ 2 ο arcsin x qiymatlar sohasini toping. 7. Tenglamani yechingπtgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 1 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 26 26 12 ; 26 38-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 82° 7π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − π ππ 150° − ππ‘π135°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 1ο arccos x qiymatlar sohasini toping. π₯ 7. Tenglamani yeching √3 + tg 6 = 0 ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 39-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 324° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 3 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − πππ 2250° − ππ‘π180°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ ο¦ 2οΆ 3οΆ ο·ο· ο arcsinο§ο§ ο ο·ο· 2 οΈ 2 ο¨ οΈ 6. y ο½ 2 ο« arcsin x qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 3 . ο¦1 0 0οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 4 1ο· ο§ ο§ 0 1 0ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦1 0 0οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 40-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 110° 9π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: π cos πΌ = 0,8 π£π 0 < πΌ < 2 4. Ifodaning son qiymatini toping: π ππ 60° − π ππ 90° − ππ‘π135°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ 2 ο« 5arcsin x qiymatlar sohasini toping. 7.Tenglamani yeching π ππ π₯ = − 1 √2 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 184 64 99 10. Determenantni hisoblang. 112 112 112 ; 26 26 26 41-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 40° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan biri qiymati bo‘yicha qolgan sin πΌ qiymatini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: πππ 630° − π ππ 1470° − ππ‘π1125°; 5. Hisoblang arcsin 1 3 ο« arcsin 2 2 6. y ο½ 5 ο ο°arcctgx qiymatlar sohasini toping √2 7. Tenglamani yeching πππ π₯ = 2 ; ο¦1 0 2οΆ ο§ ο· ο¦ 6 ο§ 2 6οΆ ο· ο§0 2 0ο· ο¨ οΈ ο§ 3 ο¨ 6 3 ο·οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· . ο¦1 0 2οΆ ο¦ 6 2 6οΆ ο§ ο· ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 3 1 0 ο·, B ο½ ο§10,5 6 3 ο· ο§0 2 0ο· ο§ 3 6 3ο· ο¨ οΈ ο¨ οΈ 1 3 1 10. Determenantni hisoblang. 1 3 3 ; 1 3 6 42-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 65° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 7 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: sin πΌ = 0,8 π£π πΌ < π; 4. Ifodaning son qiymatini toping: π ππ 630° − π ππ 1470° − π‘π1125°; ο¦ 5. Hisoblang arcsinο§ο§ ο ο¨ 3οΆ 1 ο·ο· ο« arcsinο¦ο§ ο οΆο· 2 οΈ ο¨ 2οΈ 6. y ο½ 2 ο 3arcctgx qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 2 ; ο¦ 5 8 ο 4οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· . ο§ 9 6 5ο· ο¨ οΈ π 2 < ο¦ 5 8 ο 4οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 6 9 ο 5 ο·, ο§ 4 7 ο 3ο· ο¨ οΈ 10. Determenantni hisoblang. 1 1 1 2 2 2; ο¦ 3 2 5οΆ ο§ ο· B ο½ ο§ 4 ο 1 3ο· ο§ 9 6 5ο· ο¨ οΈ 11 3 6 43-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 84° 2π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 9 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: 15 3π tgπΌ = 8 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 180° − π ππ 150° − ππ‘π150°; ο¦ ο¦ 1 οΆοΆ ο·ο· ο¨ 5 οΈοΈ 5. Hisoblang sin ο§ arcsin ο§ ο ο¨ 6. y ο½ 2 ο« arcctgx qiymatlar sohasini toping. π₯ 7.Tenglamani yeching √2sin 3 = −1 ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· . 8. Matritsalarning qo’shing topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ ο¦1 2 οΆ ο¦ 4 - 4οΆ ο·ο·, B ο½ ο§ο§ ο·ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ο§ ο¨3 4οΈ ο¨ 0 1οΈ 10. Determenantni hisoblang. 4 4 4 2 2 2; 1 -3 6 44-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 85° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3.Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ qiymatni toping: 7 3π ctg πΌ = 24 va π < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 90° − ππ‘π2255°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ arctgx ο 2 qiymatlar sohasini toping. 1 7. Tenglamani yeching π ππ π₯ = − 4 ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· . ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ ο¦1 - 1 0 οΆ ο¦ ο 2 1 2οΆ ο§ ο· ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 2 1 1 ο·, B ο½ ο§ 0 4 5 ο· ο§3 ο1 2ο· ο§2 ο 3 7 ο· ο¨ οΈ ο¨ οΈ 84 64 1 10. Determenantni hisoblang. 2 2 2; 6 6 6 45-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 60° π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: π tg πΌ =-2,4 va 2 < πΌ < π 4. Ifodaning son qiymatini toping: πππ 30° − π ππ 60° − ππ‘π240°; ο¦ 2οΆ ο¦ 1οΆ ο·ο· ο· ο arcsinο§ο§ ο 2 ο¨ 2οΈ ο¨ οΈ 5. Hisoblang arccosο§ ο 6. y ο½ 2 ο« arctgx qiymatlar sohasini toping. 7. Tenglamani yeching tgπ₯ = 1 √3 ο¦1 2 8. Matritsalarning qo’shing topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ ο¦1 2 9. Matritsalarning ko’paytmasi topilsin: Π ο½ ο§ 3 1 ο§ ο§0 1 ο¨ 84 64 -19 10. Determenantni hisoblang. 2 2 2 ; 6 6 6 ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 3οΆ ο· 2ο·; 3 ο·οΈ 2οΆ ο· 0ο· 1ο·οΈ .Π²Π° ο¦1 0 ο§ Π ο½ ο§0 1 ο§2 0 ο¨ 2οΆ ο· 0ο· 1ο·οΈ ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ Π²Π° 1 2 3 ο¦1 ο§ Π‘ ο½ ο§2 ο§3 ο¨ 1οΆ ο· 2ο· 3 ο·οΈ 1 2 3 1οΆ ο· 2ο· 3 ο·οΈ 46-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 0° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 4 3. Trigonometrik funktsiyalardan qiymati bo‘yicha cos πΌ,qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: ππ‘π 630° − πππ 1470° − π‘π1125°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 3 ο« 2 arcsinο¨2 ο x ο© funksiyaning aniqlanish sohasini toping. 7. Tenglamani yeching tgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 2 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 2 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 6 6 12 ; 6 47-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 80° 3π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 5 3. Trigonometrik funktsiyalardan qiymati bo‘yicha ctg πΌ qiymatlarini toping: π cos = 0,8 π£π 0 < πΌ < 2 ; 4. Ifodaning son qiymatini toping: πππ 120° − π ππ 45° − ππ‘π135°; ο¦ ο¨ 1οΆ 3οΈ 5. Hisoblang sin ο§ 2 arccos ο· 6. y ο½ 2 ο arcsin x qiymatlar sohasini toping. 7. Tenglamani yechingπtgπ₯ = −5. ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· . 1 1ο· ο§ ο§ 0 1 0ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 8. Matritsalarning qo’shing topilsin: A ο½ ο§ 0 ο¦ 1 -1 0 οΆ ο¦1 0 0 οΆ ο§ ο· 9. Matritsalarning ko’paytmasi topilsin: A ο½ 0 1 1 , B ο½ ο§ 0 1 0 ο· ο§ ο· ο§ ο· ο§ 3 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 84 64 -19 10. Determenantni hisoblang. 12 12 26 26 12 ; 26 48-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 82° 7π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: 5 cos πΌ = 13 π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − π ππ 150° − ππ‘π135°; ο¦ 5. Hisoblang tg ο§ο§ arcsin ο¨ οΆ 3 ο« arctg 3 ο·ο· 2 οΈ 6. y ο½ 1ο arccos x qiymatlar sohasini toping. π₯ 7. Tenglamani yeching √3 + tg 6 = 0 ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦ 1 -6 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· 4 1ο· ο§ ο§ 0 1 0ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 0 84 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 49-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 324° 5π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 3 3. Trigonometrik funktsiyalardan qiymati bo‘yicha sin πΌ qiymatlarini toping: ctgπΌ = −3 va π£π 3π 2 < πΌ < 2π; 4. Ifodaning son qiymatini toping: π ππ 30° − πππ 2250° − ππ‘π180°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ ο¦ 2οΆ 3οΆ ο·ο· ο arcsinο§ο§ ο ο·ο· 2 οΈ 2 ο¨ οΈ 6. y ο½ 2 ο« arcsin x qiymatlar sohasini toping. √3 7. Tenglamani yeching πππ π₯ = − 3 . ο¦1 0 0οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 4 1 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦1 0 0οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· 4 1ο· ο§ ο§ 0 1 0ο· ο§ 0 ο1 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 0 184 64 99 10. Determenantni hisoblang. 12 12 12 ; 26 26 26 50-Variant 1. Gradusda ifodalangan burchakning radian o‘lchovini toping 110° 9π 2. Radianda ifodalangan burchakning gradus o‘lchovini toping: 2 3. Trigonometrik funktsiyalardan qiymati bo‘yicha tg πΌ qiymatlarini toping: π cos πΌ = 0,8 π£π 0 < πΌ < 2 4. Ifodaning son qiymatini toping: π ππ 60° − π ππ 90° − ππ‘π135°; ο¦ 5. Hisoblang arccosο§ο§ ο ο¨ 2οΆ 1 οΆ ο·ο· ο arctgο¦ο§ ο· 2 οΈ ο¨ 3οΈ 6. y ο½ 2 ο« 5arcsin x qiymatlar sohasini toping. 7.Tenglamani yeching π ππ π₯ = − 1 √2 ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο§ ο· 8. Matritsalarning qo’shing topilsin: A ο½ 0 1 0 , B ο½ ο§ 0 1 0 ο· . ο§ ο· ο§ ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ ο¦1 0 0 οΆ ο¦1 0 0 οΆ ο·, B ο½ ο§ ο· 1 0ο· ο§ ο§0 1 0ο· ο§0 0 0 ο· ο§ 0 0 1ο· ο¨ οΈ ο¨ οΈ 9. Matritsalarning ko’paytmasi topilsin: A ο½ ο§ 0 184 64 99 10. Determenantni hisoblang. 112 112 112 ; 26 26 26