Geometry Mrs. Cutbirth The button will take you to the first slide. If you are having trouble with a particular problem you may click the button to view a hint. The button will return you to the previously view slide. The slide will advance you to the next slide. The button will take you back a slide. When you complete the problem you may check your answer by clicking the answer button on the slide. Exit a ≈ __________ s = 107.5 cm A = 19,887.5 cm2 Answer Exit P ≈ ___________ a = 38.6 mm A = 4940.8 mm2 Answer Exit Regular n-gon: a = 9.6 cm and A = 302.4 cm2, P ≈ _______ Answer Exit Find the perimeter of a regular polygon if a = 9m and A ≈ 259.2 m2 Answer Exit Find the shaded area of AORNGIS of the regular octagon ROADSIGN. The apothem measures about 20 cm. Segment GI measures about 16.6 cm. G I N S R D O Answer A Exit An interior designer created the kitchen plan shown. The countertop will be constructed of colored concrete. What is its total surface area? If concrete countertops 1.5 inches thick cost $85 per square foot, what will be the total cost of this countertop? Answer Exit Find the sum of the interior angles in the polygon. Then find the value of p. Sum of interior angles = _______ p = _______ Answer Exit The measure of an exterior angle of a regular octagon is x + 7. Find x and the measure of each exterior angle of the octagon. Answer Exit Suppose a regular polygon has n sides. Write an expression to describe each of the following quantities for that regular polygon. a) the sum of the measures of the interior angles b) the measure of each interior angle c) d) the sum of the measures of the exterior angles (one at each vertex) the measure of each exterior angle. Answer Exit Find the area of the trapezoid. A = ___________ Answer Exit Find the area. A=___________ 28 cm Answer 22 cm Exit In the figure at the right, quadrilateral WXYZ is a trapezoid. a) b) Explain why ∆WXY and ∆XYZ have the same area (Hint: Consider XY as the base of both triangles.) Use the answer in part a and the Area Addition Postulate to explain why ∆WXR and ∆RYZ have the same area. Answer Exit Your test is tomorrow. It will cover all of the material from chapter 10. Exit a ≈ __________ s = 107.5 cm A = 19,887.5 cm2 𝐴= 1 𝑎𝑠𝑛 2 Plug in for A and s, then solve your equation. Exit P ≈ ___________ a = 38.6 mm A = 4940.8 mm2 𝐴= 1 𝑎𝑃 2 Plug in for A and a, then solve your equation. Exit Regular n-gon: a = 9.6 cm and A = 302.4 cm2, P ≈ _______ 𝐴= 1 𝑎𝑃 2 Plug in for A and a, then solve your equation. Exit Find the perimeter of a regular polygon if a = 9m and A ≈ 259.2 m2 𝐴= 1 𝑎𝑃 2 Plug in for A and a, then solve your equation. Exit Find the shaded area of AORNGIS of the regular octagon ROADSIGN. The apothem measures about 20 cm. Segment GI measures about 16.6 cm. G I Find the area of the regular polygon 1 using the formula, 𝐴 = 2 𝑎𝑠𝑛. a = apothem s = side length (GI) n = number of sides Then multiply that value by the fraction of the polygon that is shaded. What fraction of the total sides is shaded? N S R D O A Exit 1. The shape is made up of two rectangles and one regular octagon. 3. To calculate the cost you will need to know how many square feet you have. If your area is in in2, you will need to do a conversion. There are 144 in2 in 1ft2. 24 in 2. The apothem is the distance from the center to the side. Exit Find the sum of the interior angles in the polygon. Then find the value of p. Sum of interior angles = _______ p = _______ 𝑠𝑢𝑚 = 𝑛 − 2 180 Where n = the number of sides To find p, set up and equation. Add up all of the angles and set them equal to the sum you found. Exit The measure of an exterior angle of a regular octagon is x + 7. Find x and the measure of each exterior angle of the octagon. The sum of the exterior angles is 360o. To find one exterior angle, divide the sum by the number of sides. To calculate x you can then set up an equation. Exit Find the area of the trapezoid. A = ___________ 1 𝐴 = 2 ℎ(𝑏1 + 𝑏2 ) h= perpendicular height 𝑏1 and 𝑏2 are the parallel bases Exit Find the area. A=___________ 1 A = 2 𝑏ℎ The b and h must be perpendicular. 28 cm 22 cm Exit a= 2 61 𝑐𝑚 3 𝑜𝑟 61. 6𝑐𝑚 Exit P = 256mm Exit P = 63cm Exit P = 57.6 m Exit A = 996 cm2 Exit A = 50 ft2 or 7200 in2 Cost = $4250 Exit Sum = 900 p = 50 Exit x = 38 45o Exit a) b) (n – 2)180 𝑛−2 180 𝑛 c) 360 d) 360 𝑛 Exit A = 297 in2 Exit A = 308 cm2 Exit a) b) The area formula for a triangle is A = ½ bh. Both triangles share the same base and have the same height. Both triangles have the same area. If you subtract the same area from each triangle, then the remaining amount on each triangle will be the same. Exit