Advertisements
Advertisements
प्रश्न
Evaluate: \[125\sqrt[3]{\alpha^6} - \sqrt[3]{125 \alpha^6}\]
उत्तर
Property:
For any two integers a and b
\[\sqrt[3]{ab} = \sqrt[3]{a} \times \sqrt[3]{b}\]
From the above property, we have:
\[125\sqrt[3]{a^6} - \sqrt[3]{125 a^6}\]
\[ = 125\sqrt[3]{a^6} - \left( \sqrt[3]{125} \times \sqrt[6]{a^6} \right)\]
\[= 125 \times a^2 - \left( 5 \times a^2 \right)\]
∴ ( \[\sqrt[3]{a^6} = \sqrt[3]{\left\{ a \times a \times a \right\} \times \left\{ a \times a \times a \right\}} = a \times a = a^2 and \sqrt[3]{125} = \sqrt[3]{5 \times 5 \times 5} = 5\])
\[= 125 a^2 - 5 a^2 \]
\[ = 120 a^2\]
APPEARS IN
संबंधित प्रश्न
A perfect cube does not end with two zeroes.
Find which of the following number is cube of rational number \[\frac{125}{128}\] .
Evaluate: \[\sqrt[3]{8 \times 17 \times 17 \times 17}\]
Find the cube root of the following number.
729
Find the cube root of the following number.
−512
Find the cube of: 0.8
Which of the following are cubes of an even number
216, 729, 3375, 8000, 125, 343, 4096 and 9261.
The cube of a one-digit number cannot be a two-digit number.
Cube of an even number is odd.
Square of a number is positive, so the cube of that number will also be positive.
