To find the largest size sphere that can fit inside the box, we need to determine the diameter of the sphere.
The diameter of the sphere is equal to the shortest side length of the box, which in this case is 12 inches.
The surface area of a sphere with diameter d is given by the formula:
Surface Area = 4πr^2
where r is the radius of the sphere.
Since the diameter is 12 inches, the radius is half of the diameter, which is 6 inches.
Substituting the value of the radius into the formula, we get:
Surface Area = 4π(6)^2 = 4π(36) = 144π square inches.
Therefore, the surface area of the largest size sphere that can fit in the box is 144π square inches.
A rectangular box is 12 in. × 14 in. × 18 in. What is the surface area of the largest size sphere that could fit in this box? Leave your answer in terms of pi.(1 point)%0D%0A6 in2
5 answers
just inches
Apologies for the confusion. The surface area of the largest size sphere that can fit in the box is 144 square inches.
not square inches inches
Apologies for the confusion once again. The largest size sphere that can fit in the box would have a diameter equal to the shortest side length of the box, which is 12 inches. Therefore, the surface area of the largest size sphere would be:
Surface Area = 4πr²
= 4π(6)²
= 144π square inches.
So, the surface area of the largest size sphere that can fit in the box is 144π square inches.
Surface Area = 4πr²
= 4π(6)²
= 144π square inches.
So, the surface area of the largest size sphere that can fit in the box is 144π square inches.