In Desperate need of help: How do I go about solving 3^{x^2 + x} = 9.

Let's get a new equation, first. After subsituting 3^2 for 9, we have this:

3^(x^2 + x) = 3^2

This equation shows two powers of 3 set equal to one another. Can you use a basic property of exponents, to write another equation where x does not appear in any exponents?
 
Let's get a new equation, first. After subsituting 3^2 for 9, we have this:

3^(x^2 + x) = 3^2

This equation shows two powers of 3 set equal to one another. Can you use a basic property of exponents, to write another equation where x does not appear in any exponents?
So the answer would be x=1 right? My school uses an online system to do homework and it’s telling me x=1 is wrong?
 
So the answer would be x=1 right?
That's part of the answer.

Did you write (and maybe solve) a new equation, as I suggested? If so, may I see the equation and your work? :cool:

If you did not solve an equation, how did you get x = 1?
 
Here's the basic property of exponents that I have in mind:

Given b^m = b^n, then m = n

In other words, if two powers of the same base are equal, then the exponents must be equal. Here are some examples:

14^2 = 14^z means z = 2

A^(4y) = A^(y - 5) means 4y = y - 5

(3/4)^(t^3/17) = (3/4)^(4t^5) means t^3/17 = 4t^5

If you apply this property to the given equation in your exercise (after substituting 3^2 for 9), you'll get a basic quadratic equation to solve for x. (There are two solutions.)
 
So the answer would be x=1 right? My school uses an online system to do homework and it’s telling me x=1 is wrong?
Please reply showing how you followed through on the steps and hints you were provided. You created the equation they'd almost given you, you solved this using the Quadratic Formula, you got the two values, and... how did you get that "x=1" is the only answer?

Please be complete. Thank you! ;)
 
So the answer would be x=1 right? My school uses an online system to do homework and it’s telling me x=1 is wrong?
Well clearly x = 1 is NOT wrong.

\(\displaystyle x = 1 \implies x = 1 \implies x^2 = 1 \implies x^2 + x = 1 + 1 = 2 \implies 3^{(x^2 +x)} = 3^2.\)

But x = 1 is not the ONLY correct answer. That is why the computer said you were wrong.
 
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