help plz

+1

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Find all nonnegative numbers x such that \(\sqrt{x}+2=\sqrt{x+100}.\)

Oofrence Oct 16, 2019

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Best Answer

+2

Solve for x:
sqrt(x) + 2 = sqrt(x + 100)

Raise both sides to the power of 2:
(sqrt(x) + 2)^2 = x + 100

Subtract x + 100 from both sides:
-100 + (sqrt(x) + 2)^2 - x = 0

-100 + (sqrt(x) + 2)^2 - x = 4 sqrt(x) - 96:
4 sqrt(x) - 96 = 0

Add 96 to both sides:
4 sqrt(x) = 96

Divide both sides by 4:
sqrt(x) = 24

Raise both sides to the power of two:

x = 576

Guest Oct 16, 2019

3⁺⁰ Answers

+2

I could find only one positive value for x:

x = 576

Guest Oct 16, 2019

+1253

0

I graphed the equations and found that the only value is x = 576

CoolStuffYT Oct 16, 2019

+2

Best Answer

Solve for x:
sqrt(x) + 2 = sqrt(x + 100)

Raise both sides to the power of 2:
(sqrt(x) + 2)^2 = x + 100

Subtract x + 100 from both sides:
-100 + (sqrt(x) + 2)^2 - x = 0

-100 + (sqrt(x) + 2)^2 - x = 4 sqrt(x) - 96:
4 sqrt(x) - 96 = 0

Add 96 to both sides:
4 sqrt(x) = 96

Divide both sides by 4:
sqrt(x) = 24

Raise both sides to the power of two:

x = 576

Guest Oct 16, 2019

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