Squares and triangles - class-VIII
Description: squares and triangles | |
Number of Questions: 36 | |
Created by: Nitesh Divan | |
Tags: squares and square roots integer, power and roots reviewing number concepts square and square root squares, square roots, cubes, cube roots square roots and cube roots maths integers, powers and roots square and square roots |
Find the value of each of the following, using the column method.
$(23)^2$
$(52)^2$
$144$ is the square of
Square of $51$ is _______.
Find the number whose square root is twice of its cubic root.
The unit digit of the square of the number $78$ is
Solve:$(23.1)^2+(48.6)^2-(39.8)^2$
Non-perfect square numbers between square of $21$ and $22$
Write the $(T)$ of false $(F)$ for the following statements.
The product of two square number is a square number.
Find the square of the number $17$.
Give the square of number $22$.
The value of $3x\sqrt{2y}$ is
Find the square of $59$
$13^2 = 169$, Is it true for only $13$?
If $ \displaystyle (ab^{-1})^{2x-1}=(ba^{-1})^{x-2} $ then what is the value of x?
Find the square of: $6.3$
Is $2352$ a perfect square ? If not, find the greater number closest to $2352$, which is a perfect square. Find the square root of the new number.
If $\displaystyle { m }^{ -1 }=-\frac { 1 }{ 3 } $, then $\displaystyle { m }^{ -2 }$ is equal to
Which number is added to the missing place of $10000+2400+.......$ to form a square of $112$?
$025$ is square of $55$.What digit should replace $$?
$25$ is a square of $25$. Which digit should replace $$?
Find the square of rational number: $\dfrac{7 \times 7\times 4}{28 \times 14}$
Find the square of rational number $\dfrac{13}{26}$.
What is the square of $\dfrac{66}{11}$?
$5*25$ is a square of $75.$Which digit should replace $*$?
What is the square of $\dfrac{9}{10}$?
What is the square of $\dfrac{36}{100}$?
Find the square of rational number: $\dfrac{17 \times 18}{2 \times 9}$
Find the square of rational number $\dfrac{13 \times 12}{10 \times 13}$.
What is the square of $\dfrac{1}{100}$?
$025$ will form a square of $95$. Which digit should replace $$?
$(\cfrac{9 \times 12}{4\times 3})^2$ = ?
$(\dfrac{24}{4\times 12})^2$ = ?
$(\dfrac{30 \times 25}{60\times 5})^2$ = ?
If a four-digit perfect square number is such that the number formed by the first two digits and the number formed by the last two digits are also perfect squares, identify the four digit number.
Determine the square for the rational number: $(\dfrac{16\times24}{48})$
Determine the square for the rational number: $(\cfrac{5\times25}{50})$