Find the area of the regular figure shown here when the apothem
is 5 meters, the base is 3 meters, and the radius of the circle is
2.5 meters.
Find the area of the regular figure shown here when the apothem is 5 meters, the...
Find the total surface area of the regular octahedron shown
here. All edges are 5 cm.
Find the length of the apothem ‘a’ of a regular 8-sided polygon if the radius of the circumscribed circle is 17.
Find the area of the figure shown here when a =
150o, r = 10 cm, and R = 15
cm
R aº
Find the shaded area shown here when h1 = 10
in., h2 = 7 in., b = 22 in., and the
diameter of the circle = b.
Refer to the figures below. An apothem of the regular hexagon is shown. 6. b. 10 15 V Find the perimeter of figures a, b, and c and find the area of figures a, b, and c. 7. Find Area of the triangle 13 5 12
only question 61
Find the area of the base of the right regular pyramid. Then find its total surface area. Give the exact answer and an approximation to the nearest tenth. The measurements are in meters. 61. 62. 21 17 10
Find the area of the base of the right regular pyramid. Then find its total surface area. Give the exact answer and an approximation to the nearest tenth. The measurements are in meters. 61. 62. 21 17 10
4. Find the area of a regular nonagon (9 sides) circumscribed a circle of radius 10 inches 5. Measuring Distance Indirectly
please help with 1 through 6
vProbSet5a%20(2).pdf 1. Find the area between f(x) 2-x2 and f(x) x Concrete sections for a new building in meters are as shown. 2. 5.5S Find the area of the face of the concrete section where the right half of the curve is y-V5-x. Round to two decimal places. a) b) Find the volume of the concrete section. One cubic meter of concrete weighs 5000 Ibs. Find the weight of the concrete section. :1-Rev-Prob-Set53%20(2) pat...
Find the area of the shaded region in the figure below, if the radius of the outer circle is 6 and the radius of the inner circle is 2. Keep your answer in terms of st.
Find the volume of the regular octahedron shown here. All edges
are 20 in.