%5E3%2F5%3D8.jpeg "(x+6)^3/5=8")
Solving the Equation: (x+6)^(3/5) = 8
This equation involves a fractional exponent, making it a bit more complex than a simple linear equation. Let's break down the steps to solve for 'x'.
Understanding Fractional Exponents
Remember that a fractional exponent represents a combination of a root and a power. In this case, (3/5) means we're taking the fifth root and then cubing the result.
Solving the Equation
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Isolate the term with the fractional exponent: Since the entire term (x+6) is raised to the power (3/5), we need to isolate it first. This equation is already in this form.
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Eliminate the fractional exponent: To get rid of the (3/5) exponent, we need to raise both sides of the equation to the reciprocal power, which is (5/3).
[(x+6)^(3/5)]^(5/3) = 8^(5/3) -
Simplify: The exponents cancel out on the left side, leaving us with:
x + 6 = 8^(5/3) -
Calculate the right side: Calculate 8^(5/3). This means finding the cube root of 8 (which is 2) and then raising it to the power of 5.
x + 6 = 2^5 x + 6 = 32 -
Solve for x: Subtract 6 from both sides to isolate 'x'.
x = 32 - 6 x = 26
Solution
Therefore, the solution to the equation (x+6)^(3/5) = 8 is x = 26.