Question 1 :
Which of the following number has same unit digit as its cube?
Question 3 :
What number must be multiplied to $6912$, so that the product becomes a perfect cube?
Question 4 :
Write the correct answer from the given four options:<br/>The one's digit of the cube of $23$ is ______.
Question 5 : <div><span>Find the smallest number by which the following number must be multiplied to obtain a perfect cube:</span><br/></div>$675$
Question 7 :
What is the value of $\displaystyle \sqrt [ 3 ]{ -8 } -\sqrt [ 3 ]{ -216 } $?
Question 9 :
Find the smallest number which should be multiplied to $392$ to make it a perfect cube.
Question 10 :
The smallest natural number by which $25$ must be multiplied to get a perfect cube is?
Question 12 :
<span>Find the smallest number by which </span><span>$135$</span><span> must be divided, so that the quotient is a perfect cube.</span>
Question 16 :
What is the value of $\displaystyle \sqrt [ 3 ]{ 27 } \times \sqrt [ 3 ]{ -27 } $ ?
Question 19 :
<span>Find the smallest number by which $72$ must be multiplied, so that the product is a perfect cube.</span>
Question 20 :
Choose the correct answer from the given four options:<br/>Which of the following numbers is a perfect cube?
Question 22 :
Given that, $512 = 8^{3}$ and $3.375 = (1.5)^{3}$, find the value of $\sqrt[3]{512} \times \sqrt[3]{3.375}$
Question 23 :
What is the value of $\displaystyle \sqrt [ 3 ]{ 64 } \div \sqrt [ 3 ]{ -64 } $ ?<br>
Question 24 :
If the unit digit of $\displaystyle { x }^{ 3 }$ is $3$, then the unit digit of $x$ is:
Question 26 :
Which odd number needs to be taken out to form a cube number?<br/>$21 + 23 + 29 + 27 + 19 + 25$<br/>
Question 28 :
Find the smallest number by which $4232$ must be multiplied to make it a perfect cube.
Question 29 :
What will be the unit digit of $\displaystyle { 137959 }^{ 3 }$.
Question 30 :
Find the smallest number which should be multiplied to $231525$ to make it a perfect cube.
Question 31 :
If we write $\displaystyle { n }^{ 3 }$ as the sum of consecutive odd numbers, then what will be the first term?
Question 33 :
Find the smallest number which should be multiplied to $1352$ to get a perfect cube.
Question 34 :
If $\displaystyle { a }^{ 2 }$ ends in an even number of zeros, then $\displaystyle { a }^{ 3 }$ ends in an odd number of zeros.
Question 36 :
Find the smallest numbers by which $11979$ must be multiplied so that the product is a perfect cube.
Question 37 :
<span>Find the smallest number by which </span><span>$192$</span><span> must be divided, so that the quotient is a perfect cube.</span>
Question 39 :
How many consecutive odd numbers are needed to obtain sum as $\displaystyle { 3 }^{ 3 }$?<br/>
Question 45 :
Find the smallest number by which $9000$ should be divided so that the quotient becomes a perfect cube?
Question 48 :
Write the correct answer from the given four options:<br/>If $m$ is the cube root of $n$, then $n$ is ____.
Question 49 :
The smallest number by which 2560 must be multiplied so that the product is a perfect cube is:
Question 50 :
How many consecutive odd numbers will be needed to obtain the sum of $4^3$?<br>
