Question

Hey,
Brainly People

Solve this question

$if \: x + \sqrt{5} = 4 + \sqrt{y}$

Find X + Y..

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Answer 1

Solution :-

Q: x + √5 = 4 + √y

Let us suppose that the value y = 5

So, x + √5 = 4 + √5

√5 cancelled in both sides,

=> x = 4

Now,

x + y = 4 + 5 = 9

Hence,

The value of x + y = 9

Answer 2

Answer:-

$\bold{x + \sqrt{5} = 4 + \sqrt{y} }$

Comparing like sides, we get:-

$\huge \mathfrak{ \red{{x = 4}}}$

$\bold { \sqrt{y} = \sqrt{5} }$

$\huge \bold \purple{y = 5}$

Therefore,

$\textsf{x+y= 4+5= 9}$