Question 1

Rationalise the denominator of 1/(2√5 + √3)

Question 2

Answer:

$\bf ➤ \underline{Solution-} \\$

$\sf \: \: \: (1)/( 2 √(5) + √(3) )$

On rationalising,

$\sf \implies(1)/( 2 √(5) + √(3) ) * (2 √(5) - √(3))/(2 √(5) - √(3))$

Combine the fractions,

$\sf \implies (1(2 √(5) - √(3)))/((2 √(5) + √(3))(2 √(5) - √(3)))$

We know that,

$\sf \implies (a + b)(a - b) = (a)^(2) - (b)^(2)$

So,

$\sf \implies (1(2 √(5) - √(3)))/((2 √(5) )^(2) - (√(3))^(2) )$

$\sf \implies (1(2 √(5) - √(3)))/(20 - 3 )$

$\sf \implies (1(2 √(5) - √(3)))/(17 )$

$\sf \implies (2 √(5) - √(3))/(17 )$

Hence,

On rationalising we got,

$\bf \implies(2 √(5) - √(3))/(17 )$

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