Answer:
The volume of each cylinder is given by the formula: V = πr^2h, where r is the base radius and h is the height of the cylinder.
When 25 cylinders are put into the half-filled container, the water level rises to the top of the container, which means that the total volume of the 25 cylinders is equal to the volume of the container. Let's assume the volume of the container is V_container.
So, 25 * πr^2 * h = V_container
Dividing both sides by 25πh gives: r^2 = V_container / (25πh)
Taking the square root of both sides gives: r = √(V_container / (25πh))
Since h = 10 cm, we can substitute this value in the formula above: r = √(V_container / (25π * 10))
Since r is the base radius of the cylinder, it must be positive. So, the final equation becomes:
r = √(V_container / (25π * 10)) cm = 5√(5/π) cm. shown
By using 3.14 for the value of π, we can calculate the value of r:
r = 5√(5/π) = 5√(5/3.14) = 5 * √(5/3.14)
= 5 * √(1.5873) = 5 * 1.259 = 6.295 cm (rounded to the first decimal place)
So, the base radius of the cylinder is approximately 6.3 cm.