Question

Find? #lim xrarr c ((x^3 - c^3)/ (x-c))#

Answer 1

`3c^2`

Explanation:

`lim_(x->c)((x^3-c^3)/(x-c))`

First, factor `x^3-c^3`
`x^3-c^3=(x-c)(x^2+xc+c^2)`

`lim_(x->c)(((x-c)(x^2+xc+c^2))/(x-c))`
`<=>lim_(x->c)(x^2+xc+c^2)`
`<=>c^2+c*c+c^2`
`<=>3c^2`

Answer 2

`3c^2`.

Explanation:

If one is familiar with the following Standard Form of Limit :

`lim_(x to a)(x^n-a^n)/(x-a)=na^(n-1)`,

then, the required limit `3c^2` follows immediately.

Here is another way to get the limit :

Let, `x=c+h," so that, (x-c)=h, and, as "x to c, h to 0`.

Further, `(x^3-c^3)/(x-c)=((c+h)^3-c^3)/h`,

`={cancel(c^3)+h^3+3ch(c+h)cancel(-c^3)}/h`,

`=[cancel(h){h^2+3c(c+h)}]/cancel(h)`,

`:."The Reqd. Lim."=lim_(h to 0) {h^2+3c(c+h)}`,

`=0^2+3c(c+0)`,

`=3c^2`, as Martin C. has readily derived!