How do I solve this?
On my assignment it says find the area
inside the square, but outside the circle, given that the radius of the
circle is 2 ft. Use 3.14 for ^
I have a picture of a square with a circle in the square, with a base 6 ft. and height 6 ft.
Here are the choices for me to mark
my answer and I can't even solve it.
A. 23.44 ft^
B. 29.72 ft^
C. 32 ft^
D. 32.86 ft.^ (The symbol ^ means 2)
Thank you for your help!
Have a blessed day!!
i think its A
find the area of the circle (pi)(r^2)
then the area of the square (6)(6)
circle area = 12.56
square area = 36
36 - 12.56 = 23.44
Circle X is the largest circle that can be drawn inside square MATH. The area of square MATH is 576 cm2. What is the approximate area of circle X?
To solve this problem, follow these steps:
1. Find the area of the circle using the formula: Area = π * r^2.
Given that the radius of the circle is 2 ft and using π ≈ 3.14,
Area of circle = 3.14 * (2^2) = 12.56 ft^2.
2. Find the area of the square using the formula: Area = length * width.
Given that the base and height of the square are both 6 ft,
Area of square = 6 * 6 = 36 ft^2.
3. Subtract the area of the circle from the area of the square to find the area between them.
Area between circle and square = Area of square - Area of circle
Area between circle and square = 36 ft^2 - 12.56 ft^2 = 23.44 ft^2.
Therefore, the area inside the square but outside the circle is 23.44 ft^2. So, your answer is option A.
To solve this problem, you need to find the area of the square and the area of the circle, and then subtract the area of the circle from the area of the square.
First, let's find the area of the circle:
The formula for the area of a circle is A = πr^2, where A is the area and r is the radius.
Given that the radius of the circle is 2 ft, we can plug it into the formula:
A = π(2^2) = π(4) = 4π ft^2
Now, let's find the area of the square:
The formula for the area of a square is A = s^2, where A is the area and s is the length of the side.
Given that the square has a side length of 6 ft, we can plug it into the formula:
A = (6)^2 = 36 ft^2
Finally, subtract the area of the circle from the area of the square to find the area inside the square, but outside the circle:
Area = Square area - Circle area = 36 ft^2 - 4π ft^2
To get the numerical value, use the approximation 3.14 for π:
Area = 36 ft^2 - 4(3.14) ft^2
Area = 36 ft^2 - 12.56 ft^2 = 23.44 ft^2
Therefore, the correct answer to mark is A. 23.44 ft^2.