Question 272270
Please help me solve the following: Simplifying Complex Rational Equations
:
We can't solve; it's not an equation, we only simplify
{{{3/(4x^3)}}} - {{{1/(2x)}}}
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{{{3/(2x)}}} + {{{5/(4x^3)}}}
:
Actually 4x^3 is the common denominator for both fractions
{{{(3-2x^2)/(4x^3)}}} 
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{{{(3(2x^2)+5)/(4x^3)}}}
which is
{{{(3-2x^2)/(4x^3)}}} 
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{{{(6x^2+5)/(4x^3)}}}
Invert the dividing fraction and multiply, conveniently the 4x^3's cancel
{{{(3-2x^2)/(4x^3)}}} * {{{(4x^3)/(6x^2+5)}}} = {{{(3-2x^2)/(6x^2+5)}}}; that's about all we can do with it