Advertisements
Advertisements
Question
\[\sqrt[5]{6} \times \sqrt[5]{6}\] is equal to
Options
\[\sqrt[5]{36}\]
\[\sqrt[5]{6 \times 0}\]
\[\sqrt[5]{6}\]
\[\sqrt[5]{12}\]
Advertisements
Solution
Given that`5sqrt6 xx 5sqrt6`, it can be simplified as
`5sqrt6 xx 5 sqrt6 = 5 sqrt(6xx6)`
` = 5sqrt36`
APPEARS IN
RELATED QUESTIONS
Simplify the following expressions:
`(4 + sqrt7)(3 + sqrt2)`
Rationalise the denominator of the following:
`3/(2sqrt5)`
Rationalise the denominator of the following
`(sqrt2 + sqrt5)/3`
Express of the following with rational denominator:
`1/(sqrt6 - sqrt5)`
Express the following with rational denominator:
`(sqrt3 + 1)/(2sqrt2 - sqrt3)`
Rationales the denominator and simplify:
`(2sqrt6 - sqrt5)/(3sqrt5 - 2sqrt6)`
If \[x = 3 + 2\sqrt{2}\],then find the value of \[\sqrt{x} - \frac{1}{\sqrt{x}}\].
`1/(sqrt(9) - sqrt(8))` is equal to ______.
After rationalising the denominator of `7/(3sqrt(3) - 2sqrt(2))`, we get the denominator as ______.
Rationalise the denominator of the following:
`(3sqrt(5) + sqrt(3))/(sqrt(5) - sqrt(3))`
