A cylindrical container has a diameter of 14cm and a height of 20cm and is full of water. A student pours the water into another cylinder of diameter 20cm. How deep is the water in the second cylinder?

Question

Illustrate an image showing two empty cylindrical containers side by side. The first cylinder should be smaller with a diameter of 14cm and a height of 20cm. The second cylinder should be larger with a diameter of 20cm. Both should be transparent and the first cylinder should indicate it was full of water and now being poured into the second one. The image should also capture the motion of water flowing from the smaller to the larger cylinder. Exclude any measurements, text, or numbers from the image.

A cylindrical container has a diameter of 14cm and a height of 20cm and is full of water. A student pours the water into another cylinder of diameter 20cm. How deep is the water in the second cylinder?

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10 answers
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Answer 1

oobleck answered
3 years ago

V = Bh where B=πr^2

So, the ratio of heights is the inverse of the square of the ratio of diameters: (14/20)^2 making the height
(14/20)^2 * 20 = 9.8cm

Answer 2

henry2, answered
3 years ago

V = pir^2h = 3.147^220 = 3079 cm^3 of water.

pi*r^2*h = 3079
3.14*10^2*h = 3079
h = 9.8 cm = depth of water.

Answer 3

ana answered
2 years ago

15 liters of water are poured into a cylinder of diameter 20 cm. Use the value 3.14 for Pi to find how deep the water is in the cylinder.

Answer 4

Hawwah iman Alhassan answered
1 year ago

D=

Answer 5

Gee answered
1 year ago

Solving on the way

Answer 6

Gee answered
1 year ago

¥¡14/2=7:20/2=10=7«10×20/7

Answer 7

Gee answered
1 year ago

V of cyl =tr2h35/7×5=25

Answer 8

Gee answered
1 year ago

15 plate of rice drp num

Answer 9

Gee answered
1 year ago

Rice

Answer 10

Explain Bot answered
7 months ago

To find the depth of the water in the second cylinder, we can use the principle of conservation of volume. The volume of water remains the same when transferred from one container to another.

Step 1: Calculate the volume of water in the first cylinder.
The first cylinder has a diameter of 14cm and a height of 20cm.
The formula for calculating the volume of a cylinder is V = πr^2h, where V is the volume, r is the radius, and h is the height.
The radius of the first cylinder is half the diameter, so r = 14cm / 2 = 7cm.
Substituting the values into the formula, we have V1 = π(7cm)^2(20cm).

Step 2: Calculate the depth of the water in the second cylinder.
The second cylinder has a diameter of 20cm and we need to find its depth.
Therefore, we need to calculate the height of the water in the second cylinder, given that the volume remains the same.
The formula for the volume of a cylinder is V = πr^2h.
We already know the volume (V1) from the first cylinder and the radius (r) of the second cylinder is half the diameter, so r = 20cm / 2 = 10cm.
Substituting the known values into the volume formula, we can solve for the height (h): V1 = π(10cm)^2h.

Solving for h in V1 = π(10cm)^2h: h = V1 / (π(10cm)^2).

By substituting the value of V1 calculated in step 1, we get h = V1 / (π(10cm)^2).

After evaluating this expression, we can determine the depth of the water in the second cylinder.

A cylindrical container has a diameter of 14cm and a height of 20cm and is full of water. A student pours the water into another cylinder of diameter 20cm. How deep is the water in the second cylinder?

V = Bh where B=πr^2

V = pi*r^2*h = 3.14*7^2*20 = 3079 cm^3 of water.

15 liters of water are poured into a cylinder of diameter 20 cm. Use the value 3.14 for Pi to find how deep the water is in the cylinder.

D=

Solving on the way

¥¡14/2=7:20/2=10=7«10×20/7

V of cyl =tr2h35/7×5=25

15 plate of rice drp num

Rice

To find the depth of the water in the second cylinder, we can use the principle of conservation of volume. The volume of water remains the same when transferred from one container to another.

V = pir^2h = 3.147^220 = 3079 cm^3 of water.