Given that `vec(E ) = {( 3x^(2) + y)hat(i) + xj } V//m`, find the work done in moving a charge `-2 mu C ` from ( 0,5,0) to ( 2,-1,0) by taking the path
(a) `( 0,5,0) rarr( 2,5,0) rarr ( 2,-1,0) `
(b) `y = 5-3x`

Calculate the work done by the force vec(F) = y hat(i) to move the particle from (0,0) to (1,1) in the following condition (a) y = x (b) y = x^(2)

A force F = (2hat(i)+5hat(j)+hat(k))N is acting on a particle. The particle is first displacement from (0, 0, 0) to (2m, 2m, 0) along the path x = y and then from (2m, 2m, 0) to (2m, 2m, 2m) along the path x = 2m, y = 2 m. The total work done in the complete path is

lim_(x rarr0)(2^(5x)-1)/(x)

If [(2x+y,0),(5,x)] = [(5,0),(5,3)] then y is equal to (a) 1 (b) 3 (c) 2 (d) -1

lim_ (n rarr0) (x sin ^ (2) 3x) / (tan ^ (2) 5x)

Electric and magnetic field are directed as E_(0) hat(i) and B_(0) hat(k) , a particle of mass m and charge + q is released from position (0,2,0) from rest. The velocity of that particle at (x,5,0) is (5 hat(i) + 12 hat(j)) the value of x will be

Find X and Y ,if X+Y =[(7,0),(2,5)] and X-Y= [(3,0),(0,3)]

I. 3x^(2) - 17x+10 = 0 II. 2y^(2) -5y+3 = 0

{:((2a - 1)x + 3y - 5 = 0),(3x + (b - 1) y - 2 = 0):}

Find the equation of the line passing through the points A(-1,1) and B(2,-4). (a) 3x+5y+2=0 (c) 2x+3y+5=0 (b) 5x+3y+2=0