I’m struggling to solve this exponentials problem
- Thread starter NickKen02
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I agree with how you began, which is to express everything in powers of 5:
[MATH]\left(\frac{(5^2)^{2x-1}}{(5^3)^{x+3}}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]\left(\frac{5^{2(2x-1)}}{5^{3(x+3)}}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]\left(\frac{5^{4x-2}}{5^{3x+9}}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]\left(5^{x-11}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]5^{2x-22}=5^{\frac{x}{3}}[/MATH]
Now you can equate exponents, and solve for \(x\)...what do you find?
[MATH]\left(\frac{(5^2)^{2x-1}}{(5^3)^{x+3}}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]\left(\frac{5^{2(2x-1)}}{5^{3(x+3)}}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]\left(\frac{5^{4x-2}}{5^{3x+9}}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]\left(5^{x-11}\right)^2=5^{\frac{x}{3}}[/MATH]
[MATH]5^{2x-22}=5^{\frac{x}{3}}[/MATH]
Now you can equate exponents, and solve for \(x\)...what do you find?
D
Deleted member 4993
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On 3rd line - you lost the "square" on the left-hand-side.
So the equation could be re-written as:
\(\displaystyle \frac{5^{2(2x-1)}}{5^{3(x+3)}} = \ \sqrt[6]{5^x}\)
Thanks a lot. I’m kicking myself because it was as simple as remembering to subtract the exponents when put in a situation with an equivalent base and a quotient set up, the answer I got was x=13.2, and after verifying in the original equation it checks out!