Question

How do you evaluate square root of `a^(11) + sqrt(a^5)`?

Answer 1

`a^(5/2)(a^(17/2)+1)` This may also be written as: `sqrt(a^5)(sqrt(a^(17))+1)`

The use of the word 'evaluate' in my book states; 'give value to'. This is not possible unless you know the value of `a`

Explanation:

`color(blue)("Some facts about indices and roots ")`

Consider the example `sqrt(b)` this may also be written as `b^(1/2)`

`root(3)(b)=b^(1/3)`
`root(4)(b)=b^(1/4)`
`root(5)(b)=b^(1/5)`
So the root is the denominator of the 'power'

`sqrt(b^2)=b^(2/2)=b^1=b`
`sqrt(b^3)=b^(3/2)`
`sqrt(b^4)=b^(4/2)=b^2`
and so on

Consider the example `3^3xx3" " =" " 3xx3xx3xx3" "=" "3^4`

3 may, if you so wish, be written as `3^1`

So `3^2xx3" "=3^2xx3^1" "=" "3^(3+1)" "=" "3^4`

So `b^5xxb^7=b^(5+7)=b^(12)`

~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
`color(blue)("Answering the question")`

Given:`" " a^11+sqrt(a^5)`

Write as:

`[a^11]+[sqrt(x^5)xx1]`

But `a^11` is the same as `a^(22/2)" "=" "a^(5/2+17/2)" "=" "a^(5/2)xxa^(17/2)`

Also `sqrt(a^5)` is the same as `a^(5/2)`

Putting it all together we have

`[a^(5/2)xxa^(17/2)]+[a^(5/2)xx1]`

Factor out the `a^(5/2)` giving:

`a^(5/2)(a^(17/2)+1)`

This may also be written as:

`sqrt(a^5)(sqrt(a^(17))+1)`

NOT CONVINCED THIS HELPS