Why Does the Equation x/2 = 3/y Represent a Hyperbola?

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The equation x/2 = 3/y represents a hyperbola due to its transformation into the standard form v² - u² = 12 after applying a coordinate rotation by π/2 radians. The third term of the expansion of (2x - y)³ is correctly calculated as 6xy² using the binomial theorem, specifically C(3,2)(2x)(-y)². This discussion clarifies the relationship between the equation and hyperbolic geometry through coordinate transformations.

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dynamic998
x/2 = 3/y. Can anyone explain why this is an hyperbola?

find the third term of the expansion (2x-y)to the third power.
I know u have to do the things with the combinations but all i get is 20xy² but the answer is 6xy². Can anyone help?
 
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find the third term of the expansion (2x-y)to the third power.
I know u have to do the things with the combinations but all i get is 20xy?but the answer is 6xy? Can anyone help?

I think you mean to find the 3rd term in descending powers of x


Method 1:
(2x-y)3 = (Summation r from 0 to 3) C3r (2x)r (-y)3-r

So the third term
=C32(2x)(-y)2
=6xy2

Method 2:
You can expand (2x-y)3 directly.
 
To see that your first problem

x/2 = 3/y is a hyperbola, do a coordinate transform to rotate the coordinate axis by π/2 radians.

you will find that (let u & v be the new axis)

u=xcosθ + ysinθ
v=-xsinθ + ycosθ

Let θ = π/2

solve for x & y

x = (v-u)/sqrt(2) y=(v+u)/sqrt(2)

substituting this back into the origianal relationship gives

(v-u)(v+u)/2 =6

or

v*v - u*u = 12

This is the standard form for a hyperbola.
 

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