Suppose that the temperature T at every point (x,y) in the plane cartesian is given by the formula `T=1-x^(2)+2y^(2)`. The correct statement about the maximum and minimum temperature along the line x+y=1 is

The image of the point (-1, 3, 4) in the plane x-2y=0 is

Find the distance of the line 4x+7y+5=0 from the point (1,2) along the line 2x-y=0 .

The co-ordinate of the particle in x-y plane are given as x=2+2t+4t^(2) and y=4t+8t^(2) :- The motion of the particle is :-

A function y=f(x) is given by x = phi (t)=t^(5)-5t^(3)-20t+7 y= Psi (t)=4t^(3)-3t^(2)-18t+3, -2 lt t lt 2 Find the maximum and minimum value of the function.

Find the locus of a point whose coordinate are given by x = t+t^(2), y = 2t+1 , where t is variable.

The coordinates of a particle moving in XY-plane very with time as x=4t^(2),y=2t . The locus of the particle is

If y= sin (pt), x= sin t , then prove that (1- x^(2))y_(2)-xy_(1)+ p^(2)y= 0

Consider the planes 3x-6y-2z=15a n d2x+y-2z=5. Statement 1:The parametric equations of the line intersection of the given planes are x=3+14 t ,y=2t ,z=15 tdot Statement 2: The vector 14 hat i+2 hat j+15 hat k is parallel to the line of intersection of the given planes.

The cartesian equation of a line is (x-3)/(2)=(y+1)/(-2)=(z-3)/(5). Find the vector equation of the line.

Find the distance of the point (3, 5) from the line 2x + 3y = 14 measured parallel to the line x-2y = 1.