Question
Studdy Solution
STEP 1
What is this asking? We're asked to solve for in terms of , meaning we want to get all alone on one side of the equation. Watch out! Don't mix up and when rearranging the equation!
STEP 2
1. Isolate the term with .
2. Solve for .
STEP 3
Alright, so we've got .
Our goal is to get by itself.
First, let's tackle that on the left side.
We want to move it over to the right side, and to do that, we'll add to *both* sides of the equation.
Remember, what we do to one side, we *must* do to the other to keep things balanced!
STEP 4
So, adding to both sides gives us: Great! Now we have all by itself on the left.
STEP 5
Now, we have .
We're *so* close to getting alone.
We're multiplying by , so to undo that, we'll divide *both* sides by .
This is the key step to isolating our variable, !
STEP 6
Dividing both sides by gives us:
Boom! We did it!
We've successfully solved for in terms of .
STEP 7
Our final answer is .
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