Practice Final Exam Linear Algebra 1.) Give the vector written as a row 2.) Find the product ( ( /2 1N14 —2 ,) 3) 4) ************************************************ Conics and other solutions of equations in two variables 3.) Give the equation for a line of slope 2 that passes through the origin. 1. / 4.) Give the equation for a line of slope 2 that passes through the point (3,4). / 5.) Give the equation for the unit circle. -C’ 6.) Give the equation for the circle of radius 4 centered at the origin. 7.) Give the equation for the circle of radius 4 centered at the point (5, 7). 8.) Give the equation for the ellipse obtained by starting with the unit circle, and then scaling the x-axis by 3, and the y-axis by 2. 9.) Give the equation for the ellipse from #8, shifted right by 4 and up by 5. 7 10.) Draw the set of solutions of the equation xy 2 11.) Draw the set of solutions of the equation x 12.) Draw the set of solutions of the equation y 2 13.) Draw the set of solutions of the equation y 14.) Draw the set of solutions of the equation x = — 1. 2 y — = 1. = 1. = = . 2 y 1 15.) R_q4 is the rotation of the plane by angle = —. 11 \/\/ 2 is the set of solutions of xy If H C R = 1, then draw R_(H). 2 from #13. Give the equation 16.) Let P the set of solutions of y = x for P shifted right by 2 and up by 3. 2 ************************************************ Trigonometry 17.) What is the distance between the points (2, 5) and (3, 8)? 18.) Find the length of the unlabeled side of the triangle below. 7 19.) Find sin(s), cos(9), and tan(6) for the angle given below. (3 points.) 3 20.) What’s the Pythagorean Identity? For #21-29, graph cos(x), sin(x), tan(x), sec(x), csc(x), cot(x), arccos(x), arcsin(x), and arctan(x). 30.) What’s arccos ()? 31.) What’s arcsin(—1)? 32.) What’s arctan(—1)? Match the functions with their graphs. 33.) sin(x) 36.) sin 39.) cos(x) 42.) sin(x) () A.) 34.) sin (x + 37.) sin(x) + 1 40.) sin (x 1t’ 43.) sin(x) 35.) sin(2x) 38.) sin(x) 1 41.) 2sin(x) 44.) sin(—x) — — — B) C.) z 2 ‘Tt a 2 - - - - z 2. —l .4 -2 D.) E.) -2 F.) a z 2. 2 G.) H.) I.) 2 2 :7’ -, -2 -2 J.) 2 2. Z2 —( 2 2 R/ ., -2- Match the functions with their graphs. 45.) f(x) = fsin(x) cos(x) if x if x e (—oo,O); [0, cc). A.) 46.) g(x) = fcos(x) sin(x) B.) ************************************************ Complex numbers 47.) Find (2+i3)+(4+i5). 48.) Find (2 + i3)(1 + i4). 49.) What’s the norm of 7 + i3. 50.) Find 2(cos(3) + I sin(3))4(cos(8) + i sin(8)). if x if x (—oo,O); [0, cc). 51.) Draw an X on your answer sheet on the number 3( cos (The number z is drawn on the answer sheet.) 52.) Find ( () +i sin ())z. + 53.) Find (+i) . 7 ************************************************ Equations in one variable Write the solutions of the following trigonometric equations. 54.) tan(x) = 55.) cos(x) = 56.) cos(x) = 57.) sin(x) 58.) sin(x) —4 7 = = —2 See the answer sheet for #59-64. First Narne:_ — Last Narne: 11.) 2.) 3.)_ 4.) 12.) 8.) 13.) 9 10.) 14.) 17.) 15.) 18.) 19.) 20.) 16.) V 2 2 2 ( I I I I -‘71-! I 1 I I -IT-! 2. 2 4 V 2. 2 I -‘71-f 2. —I —I —I —21 -Zr -2 26.) cot(x) 25.) csc(x) 24.) sec(x) V 23.) tan(x) 22.) sin(x) 21.) cos(x) 2 2 2 ( I I I I I ‘7r -71-! 2. 2 I I -‘TI-! 2. 2 I I -71-! 2. 2 —I —I —I —2 -2 -iv 27.) arccos(x) 28.) arcsin(x) 29.) arctan(x) 2 I I I 3. I —( 3. —.7r 30.) 31.) 32.) 33.) 41.) 42.) 43.) 44.) 34.) 45.) 35.) 46.) 36.) 47.) 37.) 48.) 38.) 49.) 39.) 50.) 40.) —‘ 51.) 7 - - LjZ - Z 6 . N. 52.) 56.) 53.) 54.) 57.) 58.) 55.) For the #59-64, give the solutions of the equations. If there is no solution, explain why there is no solution. For at least one of the remaining problems, the domain of the equation will play an important role in the solution. remaining questions, I II ct + I. + C + I’ I C p II + Cl 62.) (x 63.) 21 e — 3)2 = = 4 —3 64.) (x+fl(2x—3) = (x+fl(x—4)