I have this algebraic fraction:
$\frac{t^4-1}{t^2-t^6}$
And I'm told the answer is:
$\frac{-1}{t^2}$
I can't for the life of me work out how to simplify it. (I'm sorry for the simple question)
I have this algebraic fraction:
$\frac{t^4-1}{t^2-t^6}$
And I'm told the answer is:
$\frac{-1}{t^2}$
I can't for the life of me work out how to simplify it. (I'm sorry for the simple question)
When faced with the problem of simplifying $\frac{x^4-1}{x^2-x^6}\;,$ you have almost too many possibilities. For instance, $x^4-1=(x^2)^2-1^2$ is a difference of squares, something that’s often useful in simplification. But one thing that should leap out at you is that $x^2$ is a common factor of both terms in the denominator, so we can write
$\frac{x^4-1}{x^2-x^6}=\frac{x^4-1}{x^2(1-x^4)}\;.$
If that had only been $x^2(x^4-1)$ instead, we could do the obvious cancellation and get $\frac{x^4-1}{x^2(x^4-1)}=\frac1{x^2}\cdot\frac{x^4-1}{x^4-1}=\frac1{x^2}\;.\tag{1}$ It isn’t but it’s close, and the desired answer is close to $\dfrac1{x^2}$, so we might try to imitate $(1)$ as far as possible:
$\frac{x^4-1}{x^2(1-x^4)}=\frac1{x^2}\cdot\frac{x^4-1}{1-x^4}=\stackrel{???}\dots=-\frac1{x^2}\;.$
Can you finish it from there?