What is the solution to the equation 1 over the square root of 8 = 4(m + 2)

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morgannakrider morgannakrider

17-02-2018
Mathematics

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What is the solution to the equation 1 over the square root of 8 = 4(m + 2)

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zrh2sfo zrh2sfo · Answer 1 · 2018-02-17T00:36:54+01:00

Solve for m:
1/sqrt(8) = 4 (m + 2)

Rationalize the denominator. 1/sqrt(8) = 1/sqrt(8)×(8^(1 - 1/2))/(8^(1 - 1/2)) = (8^(1 - 1/2))/8:
(8^(1 - 1/2))/8 = 4 (m + 2)

Combine powers. (8^(1 - 1/2))/8 = 8^((1 - 1/2) - 1):
8^((1 - 1/2) - 1) = 4 (m + 2)

Put 1 - 1/2 over the common denominator 2. 1 - 1/2 = 2/2 - 1/2:
8^(2/2 - 1/2 - 1) = 4 (m + 2)

2/2 - 1/2 = (2 - 1)/2:
8^((2 - 1)/2 - 1) = 4 (m + 2)

2 - 1 = 1:
8^(1/2 - 1) = 4 (m + 2)

Put 1/2 - 1 over the common denominator 2. 1/2 - 1 = 1/2 - 2/2:
8^(1/2 - 2/2) = 4 (m + 2)

1/2 - 2/2 = (1 - 2)/2:
8^((1 - 2)/2) = 4 (m + 2)

1 - 2 = -1:
8^((-1)/2) = 4 (m + 2)

1/sqrt(8) = 1/sqrt(2^3) = (1/sqrt(2))/2:
(1/sqrt(2))/2 = 4 (m + 2)

Rationalize the denominator. 1/(2 sqrt(2)) = 1/(2 sqrt(2))×(sqrt(2))/(sqrt(2)) = (sqrt(2))/(2×2):(sqrt(2))/(2×2) = 4 (m + 2)

2×2 = 4:
(sqrt(2))/4 = 4 (m + 2)

(sqrt(2))/4 = 4 (m + 2) is equivalent to 4 (m + 2) = (sqrt(2))/4:
4 (m + 2) = sqrt(2)/4

Expand out terms of the left hand side:
4 m + 8 = sqrt(2)/4

Subtract 8 from both sides:
4 m + (8 - 8) = (sqrt(2))/4 - 8

8 - 8 = 0:
4 m = (sqrt(2))/4 - 8
Put each term in (sqrt(2))/4 - 8 over the common denominator 4: (sqrt(2))/4 - 8 = (sqrt(2))/4 - 32/4:
4 m = (sqrt(2))/4 - 32/4

(sqrt(2))/4 - 32/4 = (sqrt(2) - 32)/4:
4 m = (sqrt(2) - 32)/4

Divide both sides by 4:
Answer: m = (sqrt(2) - 32)/(4×4)

SerenaBochenek SerenaBochenek · Answer 2 · 2019-02-14T10:35:13+01:00

Answer:

The solution is [tex]m=\frac{\sqrt2}{16}-2[/tex]

Step-by-step explanation:

Given the equation [tex]\frac{1}{\sqrt8}=4(m+2)[/tex]

we have to find the solution of above equation

[tex]\frac{1}{sqrt(8)}=4(m+2)[/tex]

As, [tex]\sqrt8=2\sqrt2[/tex]

[tex]4(m+2)=\frac{1}{2\sqrt2}[/tex]

Divide by 4 both sides, we get

[tex](m+2)=\frac{1}{8\sqrt2}[/tex]

subtracting 2 from both sides, we get

[tex]m=\frac{1}{8\sqrt2}-2[/tex]

⇒ [tex]m=\frac{\sqrt2}{16}-2[/tex]