Tag: squares and square roots

Questions Related to squares and square roots

Write down the values of:
$(5+\sqrt3)^2$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $22-10\sqrt{3}$

  2. $28+10\sqrt{3}$

  3. $22+10\sqrt{3}$

  4. $28-10\sqrt{3}$

Show answer
Correct Option: B
Explanation:

$(5+\sqrt3)^2\=5^2+(\sqrt3)^2+2\times5\times\sqrt3\=25+3+10\sqrt3\=28+10\sqrt3$

Write down the values of:
$(\sqrt5+\sqrt6)^2$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $\sqrt5+\sqrt6+\sqrt{30}$

  2. $11+2\sqrt{30}$

  3. $11+\sqrt{30}$

  4. $\sqrt{11}+60$

Show answer
Correct Option: B
Explanation:

$(\sqrt5+\sqrt6)^2\=(\sqrt5)^2+(\sqrt6)^2+2\times \sqrt5\times\sqrt6\=5+6+2\sqrt{30}\=11+2\sqrt{30}$

Expand $(5-6\sqrt3)^2$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $133+30\sqrt3$

  2. $133-60\sqrt3$

  3. $83-60\sqrt3$

  4. $83+30\sqrt3$

Show answer
Correct Option: B
Explanation:

$(5-6\sqrt3)^2\=5^2+(6\sqrt3)2-2\times5 \times6 \sqrt3\=25+108-60\sqrt3\=133-60\sqrt3$

Write down the values of:
$4(\sqrt6-3)^2$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $30-24\sqrt{6}$

  2. $15-6\sqrt{6}$

  3. $15+12\sqrt{6}$

  4. $60-24\sqrt{6}$

Show answer
Correct Option: D
Explanation:
$4(\sqrt6-3)^2\\=4[(\sqrt6)^2+3^2-2\cdot \sqrt 6\cdot 3]\\4[6+9-6\sqrt6]\\=4(15-6\sqrt6)\\=12(5-2\sqrt6)\\=60-24\sqrt6$

Write down the values of:
$(3+2\sqrt5)^2$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $29+12\sqrt{5}$

  2. $29+6\sqrt{5}$

  3. $19-12\sqrt{5}$

  4. $29-6\sqrt{5}$

Show answer
Correct Option: A
Explanation:

$(3+2\sqrt5)^2\=3^2+(2\sqrt5)^2+2\times3\times2\sqrt5\=9+4\times5+12\sqrt5\=29+12\sqrt5$

Evaluate: ${(5^2+12^2)^{\frac{1}{2}}}3$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $54$

  2. $34$

  3. $39$

  4. $59$

Show answer
Correct Option: C
Explanation:

$[(5^2+12^2)^{(\frac{1}{2})}]\times3\=(25+144)^{(\frac{1}{2})}\times3\=169^{(\frac{1}{2})}\times3\=(13^2)^{(\frac{1}{2})}\times3\=13\times3=39$

Find the square of  $2a+b$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $4a^{2} + 4ab + b^{2}$

  2. $a^{2} + ab + b^{3}$

  3. $4a^{2} + ab + b^{2}$

  4. $4a^{2} + 4ab - b^{2}$

Show answer
Correct Option: A
Explanation:

Squaring,
$(2a+b)^2$
$=(2a)^2+2(2a)(b)+(b^2)$
$=4a^2+4ab+b^2$

Find the square of $3a + 7b$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $9a^{2} + 42ab + 49b^{2}$

  2. $9a^{2} + 40ab + 49b^{2}$

  3. $18a^{2} + 42ab + 98b^{2}$

  4. $18a^{2} + 40ab + 98b^{2}$

Show answer
Correct Option: A
Explanation:

Squaring,
$(3a + 7b)^2$
$=(3a)^2+2(3a)(7b)+(7b)^2$
$=9a^2+42ab+14b^2$

$\sqrt{3\,+\,2\,\sqrt{2}}\,-\,\sqrt{3\,-\,2\,\sqrt{2}}$ is equal to 

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $2$

  2. $1$

  3. $2\sqrt{2}$

  4. $\sqrt{6}$

Show answer
Correct Option: A
Explanation:

To find, value of : $\sqrt{3\,+\,2\,\sqrt{2}}\,-\,\sqrt{3\,-\,2\,\sqrt{2}}$ 
Let $x = \sqrt{3\,+\,2\,\sqrt{2}}\,-\,\sqrt{3\,-\,2\,\sqrt{2}}$ 
Squaring both sides:
$x^2$ = $\displaystyle\,\left ( \sqrt{3\,+\,2\sqrt{2}}\,-\,\sqrt{3\,-\,2\sqrt{2}} \right )^{2}$
$\displaystyle\,x^2\,=\,3\,+\,2\sqrt{2}\,+\,3\,-\,2\sqrt{2}\,-\,2(3\,+\,2\sqrt{2})(3\,-\,2\sqrt{2})$
$\Rightarrow x^2\,=\,4$
$\Rightarrow x\,=\,2$
Hence, option 'A' is correct.

Use identities to evaluate $\displaystyle \left ( 998 \right )^{2}$

maths squares and square roots finding the square of a number finding square of a number patterns in square numbers

  1. $\displaystyle 9,96,004$

  2. $\displaystyle 9,16,004$

  3. $\displaystyle 9,96,104$

  4. $\displaystyle 9,96,324$

Show answer
Correct Option: A
Explanation:

$\left ( 998 \right )^{2}$
Using,
$(a-b)^2=a^2-2ab+b^2$
$=(1000-2)^2$
$=(1000)^2-2(1000)(2)+(2)^2$
$=1000000-4000+4$
$=9,96,004$