Tangent of acute angle between the curve...

Tangent of acute angle between the curves `y=|x^2-1|` and `y=sqrt(7-x^2)` at their points of intersection is `(5sqrt(3))/2` (b) `(3sqrt(5))/2` `(5sqrt(3))/4` (d) `(3sqrt(5))/4`

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Tangent of acute angle between the curves y=|x^2-1| and y=sqrt(7-x^2) at their points of intersection is (a) (5sqrt(3))/2 (b) (3sqrt(5))/2 (5sqrt(3))/4 (d) (3sqrt(5))/4

Tangent of acute angle between the curves y=|x^(2)-1| and y=sqrt(7-x^(2)) at their points of intersection is (5sqrt(3))/(2) (b) (3sqrt(5))/(2) (d) (3sqrt(5))/(4)

Find the angle between the lines y=(2-sqrt3)(x+5) and y=(2+sqrt3)(x-7) .

Find the angle between the lines y=(2-sqrt(3))(x+5)andy=(2+sqrt(3))(x-7)

The angle between the lines y = (2-sqrt(3))X + 5 and y = (2+sqrt(3))X - 7 is

(2)/(sqrt(3)+sqrt(5))+(5)/(sqrt(3)-sqrt(5))=x sqrt(3)+y sqrt(5)

The angle between lines y=(2-sqrt(3))x+5 and y=(2+sqrt(3))x+7 is

Tangent of acute angle between the curves `y=|x^2-1|` and `y=sqrt(7-x^2)` at their points of intersection is `(5sqrt(3))/2` (b) `(3sqrt(5))/2` `(5sqrt(3))/4` (d) `(3sqrt(5))/4`

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