How do you solve sqrt(x+5)=5-sqrtx?

2 Answers
Noah G
Apr 6, 2017

{4}

Explanation:

We start by squaring both sides.

(sqrt(x + 5))^2 = (5 - sqrt(x))^2

x + 5 = 25 - 10sqrt(x) + x

10sqrt(x) = 20

sqrt(x) = 20/10

sqrt(x) = 2

We square both sides one more time.

x = 4

Now we check our answer.

sqrt(4 + 5) = 5 - sqrt(4)

3 = 5 - 2 color(green)(√)

Practice exercises

1. Solve for x. Make sure to verify your solutions because they may or not be extraneous.

a) sqrt(2x - 2) = sqrt(x) + 1
b) sqrt(3x - 5) = sqrt(x + 6) + 1

Solutions

1. a) x = 9
b) x = 10

Hopefully this helps, and good luck!

Gió
Apr 6, 2017

I got x=4

Explanation:

We can try write it as:
sqrt(x+5)+sqrt(x)=5
square both sides:
(sqrt(x+5)+sqrt(x))^2=5^2
x+5+2sqrt(x+5)sqrt(x)+x=25
2sqrt(x+5)sqrt(x)=20-2x
square again:
4x(x+5)=400-80x+4x^2
cancel(4x^2)+20x=400-80x+cancel(4x^2)
100x=400
x=400/100=4

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