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cant do curve question (1 Viewer)
- Thread starter ek102
- Start date
pikachu975
Premium Member
The line is a tangent when the gradient of the line is equal to the derivative.
Gradient of the line:
y = 8x-4
m = 8
y' = 2kx
So 2kx = 8
k = 4/x
Now do simultaneous equations for y1 = y2
kx^2 = 8x-4
k = (8x-4)/x^2
sub in k=4/x
4/x = (8x-4)/x^2
4x = (8x-4)
4x = 4
x = 1
Sub x = 1 into k
k = 4/1
k = 4
Gradient of the line:
y = 8x-4
m = 8
y' = 2kx
So 2kx = 8
k = 4/x
Now do simultaneous equations for y1 = y2
kx^2 = 8x-4
k = (8x-4)/x^2
sub in k=4/x
4/x = (8x-4)/x^2
4x = (8x-4)
4x = 4
x = 1
Sub x = 1 into k
k = 4/1
k = 4
KingOfActing
lukewarm mess
Or
.: y = kx2 and y = 8x - 4
Where these 2 curves meet:
kx2 = 8x-4 ==> the quadratic eqn: kx2 - 8x + 4 = 0
Since one is tangent to the parabola, this eqn has one repeated root.
.: its discriminant = 82 - 4 * k * 4 = 0 ==> k = 4
.: y = kx2 and y = 8x - 4
Where these 2 curves meet:
kx2 = 8x-4 ==> the quadratic eqn: kx2 - 8x + 4 = 0
Since one is tangent to the parabola, this eqn has one repeated root.
.: its discriminant = 82 - 4 * k * 4 = 0 ==> k = 4
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