Advance Math Help!! (1 Viewer)

viraj30

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show that for points 'p' and 'q' on the parabola x= 2at, y=at^2 the tangents meet at (a(p+q), apq)

Also, i get confused with letters x, y, p, q, t..are they variables or constants?? god i am lost!!!

help would be much appreciated!
 
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nightweaver066

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This is 3U mathematics topic under Parametric Equations.

Let P = (2ap, ap^2), Q = (2aq, aq^2) where p and q are parameters which are constants.

Keep in mind that you are looking for a point of intersection between two tangents. This means you are required to find an x and a y value.




Therefore



At P(2ap, ap^2), dy/dx = p
Equation of tangent at P:




Similarly,
Equation of tangent at Q:


Solving (1) and (2) for intercepts,




From (1),



Therefore the tangents at P and Q meet at (a(p+q), apq)
 
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barbernator

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what do you use to get that form of script nightweaver?
 

barbernator

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brilliant :) good luck in 4u on monday and 3u on wednesday
 

viraj30

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This is 3U mathematics topic under Parametric Equations.

Let P = (2ap, ap^2), Q = (2aq, aq^2) where p and q are parameters which are constants.

Keep in mind that you are looking for a point of intersection between two tangents. This means you are required to find an x and a y value.




Therefore



At P(2ap, ap^2), dy/dx = p
Equation of tangent at P:




Similarly,
Equation of tangent at Q:


Solving (1) and (2) for intercepts,




From (1),



Therefore the tangents at P and Q meet at (a(p+q), apq)
can you tell what was the point of y= x^2/4a and differentiating it??
 

nightweaver066

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can you tell what was the point of y= x^2/4a and differentiating it??
In order to find the gradient at that point. Once you have the gradient at that point, you can apply the point-gradient formula in order to obtain the equation of the tangent.
 

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