Question 861750
The volume of the silver in the cone form is {{{(1/3)*16*pi*12^2}}}, and the volume of one coin is {{{(1/6)*pi*((1&1/2)/2)^2}}}.


Simplify each of those volumes.
The cone of silver:  {{{pi(16)(1/3)(12*3*4)=pi*16*12*4}}};
Coin of silver:  {{{pi*(1/6)(3/4)^2=pi(1/(2*3))(3/4)(3/4)=pi(1/2)(1/4)(3/4)=pi(3/32)}}}.


How many coin volumes are in one cone volume?
{{{(pi*16*12*4)/(pi*(3/32))}}}
Continue to simplify this rational expression.  What does it become?


{{{(16*12*4*32)/(3)}}}
{{{16*4*4*32}}}
{{{16*16*32}}}
{{{256*32}}}
{{{highlight(8192)}}}