Help with this problem needed thanks: Find y in terms of a, x, b: x^2/a^2 - y^2/b^2 = 1
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What are your thoughts? What have you tried? How far have you gotten? Where are you stuck?
Please be complete, so we can see where things are bogging down. Thank you!
topsquark
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Steven G
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I would do a step before what the infamous topsquark suggested. I would first find y2/b2 and then use the above hint.
By the way, no one on this forum will solve your problem for you. After all, this is a math help forum.
Math is not a spectator sport, so you need to be involved in solving your problem.
Please show us your work and where you seem to be getting stuck.
By the way, no one on this forum will solve your problem for you. After all, this is a math help forum.
Math is not a spectator sport, so you need to be involved in solving your problem.
Please show us your work and where you seem to be getting stuck.
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I think square-rooting both sides (remembering to put a "plus-minus" on the side opposite the [imath]y[/imath]) is probably the way to go. (The graph of the equation is that of an hyperbola, which is not a function but a relation [much like a circle's equation], so you're gonna be stuck with a messy result.)
topsquark
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Unless you want to try to put this into some kind of parametric form (I wouldn't recommend it), taking the square root is exactly what you need to do! You are over-thinking it.
-Dan
Dr.Peterson
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Can you put into words what seems weird about that? There may be something we can help you see differently.
Your goal is to express y in terms of a, b, and x, and the square root will do just that (as long as you keep in mind that there will be two square roots, positive and negative).
It just doesn't seem like it is in its simplest form written like this (in the picture below, answer is on the left).
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I'll agree with you there; the result does not look "simple". But they only asked you to "solve for [imath]y[/imath]", which you've done. You're good to go!
Dr.Peterson
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Technically, you haven't solved for y, since y isn't alone on one side; and you omitted a squaring in the denominator. I would put your answer as [math]y=\pm\sqrt{\frac{b^2x^2}{a^2}-b^2}.[/math]
Personally, I would take the square root first, and then multiply by b: [math]y=\pm b\sqrt{\frac{x^2}{a^2}-1},[/math] which feels a little simpler. And someone else might like [math]y=\pm \frac{b}{a}\sqrt{x^2-a^2}.[/math]
But simplification (whatever you choose to consider simple) is not necessary for solving. That's a separate issue, and largely aesthetic. Different forms can be equally correct!
Dr.Peterson
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Steven G
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As Dr Peterson said, you can have 1 since it is not a variable. But you thought that you could. So don't you see that the answer would be the next to last equation in post #11?
Now why can't you have 1 in your question?
What y is a function of is the variables that you would to have to the know the values of to get a value for y. We know what 1 equals and for example what 11.457 equals so you don't need to be given that information to evaluate what y equals in the equation y=xb/11.457 + 1. To find a value for y, you need to know what x and b equals. Hence, y is a function of x and b, NOT a function of x, b, 11.47 and 1.