Konstantinos Michailidis May 22, 2016 It is \displaystyle\frac{{{3}^{{4}}{x}^{{4}}}}{{{3}{x}^{{2}}}}=\frac{{{\left({3}\cdot{3}^{{3}}\right)}\cdot{\left({x}^{{2}}\cdot{x}^{{2}}\right)}}}{{{3}\cdot{x}^{{2}}}}=\frac{{\cancel{{3}}\cdot{3}^{{3}}\cdot\cancel{{x}}^{{2}}\cdot{x}^{{2}}}}{{\cancel{{3}}\cdot\cancel{{x}}^{{2}}}}={3}^{{3}}\cdot{x}^{{2}}

The expansion is \displaystyle\frac{{x}^{{4}}}{{\left({1}-{3}{x}\right)}^{{3}}}={x}^{{4}}+{9}{x}^{{5}}+{54}{x}^{{6}}+{270}{x}^{{7}}+\cdots , and is valid for \displaystyle{\left|{x}\right|}{<}\frac{{1}}{{3}} ...

See the entire simplification process below: Explanation: First, simplify the \displaystyle{x} terms within the parenthesis using this rule for exponents: \displaystyle\frac{{x}^{{{a}}}}{{x}^{{{b}}}}={x}^{{{\left({a}\right)}-{\left({b}\right)}}} ...

x5z4/x2z6 Final result : x3z10 Step by step solution : Step  1  : z4 Simplify —— x2 Equation at the end of step  1  : z4 ((x5) • ——) • z6 x2 Step  2  :Multiplying exponential expressions :  2.1    z4 ...

The antiderivative of f'(x) is f(x)+C. - Always remember the constant, which is the only difference between your answer and the one you have been given.

hint: You basically have a geometric series with the first term a_1 = x^4, r = \dfrac{1}{1+x^2}. The sum is \dfrac{a_1}{1-r}=...