Advertisements
Advertisements
प्रश्न
Simplify:
`(0.001)^(1/3)`
Advertisements
उत्तर
Given `(0.001)^(1/3)`
`(0.001)^(1/3)=((0.001xx1000)/(1xx1000))^(1/3)`
`=(1/1000)^(1/3)`
`=((1xx1xx1)/(10xx10xx10))^(1/3)`
`=(1^3/10^3)^(1/3)`
`=(1^(3xx1/3)/10^(3xx1/3))`
`=1/10`
Hence the value of `(0.001)^(1/3)` is `1/10`
APPEARS IN
संबंधित प्रश्न
Assuming that x, y, z are positive real numbers, simplify the following:
`(sqrt2/sqrt3)^5(6/7)^2`
Simplify:
`root5((32)^-3)`
Find the value of x in the following:
`(13)^(sqrtx)=4^4-3^4-6`
Write the value of \[\sqrt[3]{125 \times 27}\].
The value of m for which \[\left[ \left\{ \left( \frac{1}{7^2} \right)^{- 2} \right\}^{- 1/3} \right]^{1/4} = 7^m ,\] is
If x is a positive real number and x2 = 2, then x3 =
\[\frac{5^{n + 2} - 6 \times 5^{n + 1}}{13 \times 5^n - 2 \times 5^{n + 1}}\] is equal to
If \[x = \sqrt{6} + \sqrt{5}\],then \[x^2 + \frac{1}{x^2} - 2 =\]
Find:-
`16^(3/4)`
Simplify:
`(9^(1/3) xx 27^(-1/2))/(3^(1/6) xx 3^(- 2/3))`
