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Question
Find the acute angle between the curves at their points of intersection, y = x2, y = x3.
Solution
The angle between the curves is the same as the angle between their tangents at the points of intersection.
We find the points of intersection of y = x2 ....(1) and y = x3 .....(2)
From (1) and (2)
x3 = x2
∴ x3 - x2 = 0
∴ x2(x - 1) = 0
∴ x = 0 or x = 1
When x = 0, y = 0.
When x = 1, y = 1.
∴ the points of intersection are
O = (0, 0) and P = (1, 1)
For y = x2, `"dy"/"dx" = 2"x"`
For y = x3, `"dy"/"dx" = 3"x"^2`
Angle at O = (0, 0)
Slope of tangent to y = x2 at O
`= ("dy"/"dx")_("at O" (0,0)) = 2xx0 = 0`
∴ equation of tangent to y = x2 at O is y = 0.
Slope of tangent to y = x3 at O = `("dy"/"dx")_("at O" (0,0)) = 3 xx 0 = 0`
∴ equation of tangent to y = x3 at P is y = 0.
∴ the tangents to both curves at (0, 0) are y = 0
∴ angle between them is 0.
Angle at P = (1, 1)
Slope of tangent to y = x2 at P
`= ("dy"/"dx")_("at O" (1,1)) = 2xx1 = 2`
∴ equation of tangent to y = x2 at P is y - 1 = 2(x - 1)
∴ y = 2x - 1
Slope of tangent to y = x2 at P =`("dy"/"dx")_("at O" (1,1)) = 3xx1^2 = 3`
∴ equation of tangent to y = x3 at P is y - 1 = 3(x - 1)
∴ y = 3x - 2
We have to find angle between y = 2x - 1 and y = 3x - 2
Lines through origin parallel to these tagents are
y = 2x and y = 3x
∴ `"x"/1 = "y"/2 and "x"/1 = "y"/3`
These lines lie in XY-plane.
∴ the direction ratios of these lines are 1, 2, 0 and 1, 3, 0.
The angle θ between them is given by
cos θ = `((1)(1) + (2)(3) + (0)(0))/(sqrt(1^2 + 2^2 + 0^2)sqrt(1^2 + 3^2 + 0^2))`
`= (1 + 6 + 0)/(sqrt5 sqrt10)`
`= 7/sqrt50 = 7/(5sqrt2)`
∴ θ = `cos^-1(7/(5sqrt2))`
Hence, the required angles are 0 and `cos^-1(7/(5sqrt2))`
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