The acute angle between the lines y=3 and `y=sqrt(3x)+9` is:

If a= (tan theta)/(tan 3theta) , then the point P(a, a^2) (A) necessarily lies in the acute angle between the lines y=3x and 3y=x (B) may lie on line 3y=x or y=3x (C) necessarily lies in the obtuse angle between the lines 3y=x and y=3x (D) aepsilon (1/3, 3)

What is the acute angle between the lines x-2=0 and sqrt3x-y-2=0 ?

The acute angle between the planes 2x-y+z=6 and x+y+2z=3 is

If the acute angle between the lines 4x-y+7=0 and kx-5y-9=0 is (pi)/(2) , then find the value of k

The angle between the lines x+y-3 =0 and x-y+3=0 is alpha and the acute angle between the lines x-sqrt(3y)+2sqrt(3)=0 and sqrt(3x)-y+1=0 is beta which one of the following is correct?

The angle between the lines x+y-3=0 .0=0 and x-y+3=0 is alpha and the acute angle between the lines x-sqrt(3)y+2sqrt(3)=0 and sqrt(3)x-y+1=0 is beta which one of the following is correct?

If the point (1+cos theta,sin theta) lies between the region corresponding to the acute angle between the lines 3y=x and 6y=x, then

The angle between the lines y=(2-sqrt(3))x+5 and y=(2+sqrt(3))x-7 is A)30^(@)B)60^(@)C)45^(@)