1) the ideal surface area of a rubber ball shipped from the factory is 50.25 square nches. the company inspector insists that the balls shipped vary no more than .3 square inches of this total. To the nearest hundreth, what is the minimum value for the surface area of rubber balls shipped?
2) the ideal surface area of a rubber ball shipped from the factory is 50.25 square nches. the company inspector insists that the balls shipped vary no more than .3 square inches of this total. To the nearest hundreth, what is the maximum value for the surface area of rubber balls shipped?
I'm lost her, can someone help me out
1. Amin = 50.25 - 0.3 = 49.95in^2
2. Amax = 50.25 + 0.3 = 50.55in^2.
Sure, I can help you out. Let's solve these problems step-by-step.
1) To find the minimum value for the surface area of rubber balls shipped, we need to subtract the maximum allowable variation from the ideal surface area.
Maximum allowable variation = 0.3 square inches
Minimum value = Ideal surface area - Maximum allowable variation
Minimum value = 50.25 square inches - 0.3 square inches = 49.95 square inches (rounded to the nearest hundredth)
Therefore, the minimum value for the surface area of rubber balls shipped is approximately 49.95 square inches.
2) To find the maximum value for the surface area of rubber balls shipped, we need to add the maximum allowable variation to the ideal surface area.
Maximum allowable variation = 0.3 square inches
Maximum value = Ideal surface area + Maximum allowable variation
Maximum value = 50.25 square inches + 0.3 square inches = 50.55 square inches (rounded to the nearest hundredth)
Therefore, the maximum value for the surface area of rubber balls shipped is approximately 50.55 square inches.
Sure! I can help you with that. To find the minimum and maximum values for the surface area of the rubber balls shipped, we'll use the given information and do some calculations.
1) To find the minimum value, we need to subtract the maximum allowable variation from the ideal surface area:
Minimum value = Ideal surface area - Maximum allowable variation
= 50.25 square inches - 0.3 square inches
= 49.95 square inches (to the nearest hundredth)
2) To find the maximum value, we need to add the maximum allowable variation to the ideal surface area:
Maximum value = Ideal surface area + Maximum allowable variation
= 50.25 square inches + 0.3 square inches
= 50.55 square inches (to the nearest hundredth)
So, the minimum value for the surface area of the rubber balls shipped is 49.95 square inches, and the maximum value is 50.55 square inches.