The angle of intersection of y=a^(x) and...

The angle of intersection of `y=a^(x) and y=b^(x),` is given by

A

`tan theta=|(log(a//b))/(1-log(ab))|`

B

`tan theta =|(log(a//b))/(1+loga logb)|`

C

`tan theta=|(log(a//b))/(1-log(a//b))|`

D

None of these

Text Solution

Verified by Experts

The correct Answer is:

B

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Knowledge Check

If A and B are the points of intersection of y=f(x) and y=f^(-1)(x) , then

A

A and B necessarity lie on the line y=x

B

A and B must be coincident

C

slope of line AB may be -1

D

None of these above

Cosine of the angle of intersection of curves y = 3^(x-1) logx and y= x^(x)-1 at (1,0) is

A

1

B

`1/2`

C

0

D

`1/3`

Find the angle of intersection of the curves y =4-x^(2) and y=x^(2)

A

`theta = tan^(-1)((4sqrt(2))/(7))`

B

`theta = tan^(-1)((sqrt(2))/(7))`

C

`theta = tan^(-1)(4sqrt(2))`

D

`theta = tan^(-1)(sqrt(2))`

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