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4 votes
Determine the value of x which satisfies the following equation.
ln(4x+1)=6

User Kalman
by
7.6k points

2 Answers

3 votes

Answer:

x=(e^6-1)/4

Explanation:

ln(4x+1)=6

e^ln(4x+1)=e^6

4x+1=e^6

4x=e^6-1

x=(e^6-1)/4

User Kritner
by
8.8k points
1 vote

Answer:

Not Determinable

Explanation:

Simplifying

Ln(4x + 1) = 6

Reorder the terms:

nL(1 + 4x) = 6

(1 * nL + 4x * nL) = 6

(1nL + 4nxL) = 6

Solving

1nL + 4nxL = 6

Solving for variable 'n'.

Move all terms containing n to the left, all other terms to the right.

Reorder the terms:

-6 + 1nL + 4nxL = 6 + -6

Combine like terms: 6 + -6 = 0

-6 + 1nL + 4nxL = 0

The solution to this equation could not be determined.

User Stackcpp
by
7.6k points

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