Math Algebra Exponent Logarithm Formulas
Solve for y in the natural log equation.
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Solve for y in the natural log (ln) equation | |
Solve for x in the natural log (ln) equation |
Max A. Sobel, Nobert Lerner. 1991. Precalculus Mathematics. Prentice Hall.
In mathematics, logarithms are a crucial concept used to solve formulas where the variable is an exponent. The natural logarithm, denoted as ln, is a specific type of logarithm base (e). e is constant and has a value of 2.71828. It is irrational and transcendental. Understanding how to solve equations involving natural logarithms is essential across many fields, from engineering to economics.
A typical equation involving a natural logarithm can be represented as follows:
y = ln(x)
Here, y is the output of the natural logarithm function when x is the input and x > 0.
To solve for x given y, you use the property that the natural logarithm function is the inverse of ex, the exponential function . Therefore, if:
y = ln(x)
Then, to solve for x, you exponentiate both sides of the equation:
ey = eln(x)
Since eln(x) = x, we have:
x = ey
If you're given an equation y = ln(x) and y = 2, to find x:
x = e2 = 7.389
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