Question 283950
In this problem:

{{{(6x^7y/7)(3x^3/4y^2)}}}

If you notice first you can simplify, there is a y on both sides which one can be subtracted by the other (simplifying):
{{{y^2 - y = y}}}
{{{(6x^7*cross(y)/7)(3x^3/4y)}}}

Next you can simplify the 6 and 4, by dividing them both by 2:

{{{6 / 2 = 3}}}
{{{4 / 2 = 2}}}

{{{(3x^7/7)(3x^3/2y)}}}

Now you can multiply across, there isn't more simplifying at this point:

{{{(3x^7)(3x^3)= 9x^10}}}
{{{(7)(2y)=14y}}}

{{{9x^10/14}}}
There isn't more simplifying here. Answer.