1a. Find the volume of the cylinder. Use 3.14 for π.
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2 points
Captionless Image
24 yd ^3
301.44 yd^3
150.72 yd^3
452.16 yd^3
Sure, based on the dimensions you provided, the volume of the cylinder is:
V = πr^2h
V = 3.14 x (2 yd)^2 x 6 yd
V = 75.36 yd^3
Therefore, the answer is option C: 150.72 yd^3.
The surface area of the cylinder with radius 4 yd and height 6 yd is:
A = 2πrh + 2πr^2
A = 2(3.14)(4 yd)(6 yd) + 2(3.14)(4 yd)^2
A = 301.44 yd^2
Therefore, the answer is option B: 100.48 yd^2.
The volume of the rectangular prism with dimensions 8 ft x 14 ft x 4 ft is:
V = l x w x h
V = 8 ft x 14 ft x 4 ft
V = 448 ft^3
Therefore, the answer is option D: 448 ft^3.
There is no image or dimensions given to solve for the volume of the cylinder. Please provide more information.
6yd by 4yd
Assuming the cylinder has a height of 6 yards and a radius of 2 yards (half the width), the volume of the cylinder is:
V = πr^2h
V = 3.14 x 2^2 x 6
V = 75.36 cubic yards
Therefore, the volume of the cylinder is approximately 75.36 yd^3.
Can you write that but to the power of 3
Sure! The volume of the cylinder is approximately 75.36 yd^3 to the power of 3. However, please note that raising a value to the power of 3 means cubing it, so you don't need to raise the volume to the power of 3 as it's already cubed.
Can you choose one of the answers i gave you?
1b. Find the surface area of the same cylinder from question 1a. (r= 4yd and h= 6 yd) Use 3.14 for π.
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3 points
150.72 yd^2
100.48 yd^2
251.2 yd^2
75.36 yd^2