Answer:
The error was made in step 4, [tex]\pi[/tex] should have also been cancelled making the correct answer as 9 cm.
Step-by-step explanation:
Given that:
Volume of cylinder, [tex]V = 576 \pi\ cm^3[/tex]
Radius of cylinder, r = 8 cm
To find:
The error in calculating the height of cylinder by Sandra ?
Solution:
We know that volume of a cylinder is given as:
[tex]V = B h[/tex]
Where B is the area of circular base and
h is the height of cylinder.
Area of a circle is given as, [tex]B = \pi r^2[/tex]
Let us put it in the formula of volume:
[tex]V = \pi r^2 h[/tex]
Step 1:
Putting the values of V and r:
[tex]576\pi = \pi 8^2 h[/tex]
So, it is correct.
Step 2:
Solving square of 8:
[tex]576\pi = \pi \times 64\times h[/tex]
So, step 2 is also correct.
Step 3:
[tex]h=\dfrac{576\pi}{64 \pi} = \dfrac{64 \pi \times 9}{64\pi}[/tex]
Step 4:
Cancelling 64 [tex]\times \pi[/tex],
h = 9 cm
So, the error was made in step 4, [tex]\pi[/tex] should have also been cancelled making the correct answer as 9 cm.
