The unit of both x and y is m in the expression `y=A sin[(2pi)/(lambda)(ct-x)].` Then

The unit of t is s and that of x is m in the expression y=A cos((t)/(p)-qx). Then

Discuss the result of superposition of two waves y_(1) = A"sin" (2pi)/(lambda_(1)) (Vt - x) and y_(2) = A "sin" (2pi)/(lambda_(2)) (Vt-x) [here lambda_(1) is slightly greater than lambda_(2) ] .

The are (in square unit ) of the figure bounded by the curves y= cos x and y= sin x and the ordinates x=0, x= (pi)/(4) is-

The progressive wave, is represented by the following equation — y = 20sqrt 3 sin ((2pit)/T - (2pi x)/lambda)) , find the' displacement at time t = tau//3 and x= lambda//6

The equation of vibration of a 60 cm long string string stretched at both ends is given by y = 4 "sin" (pi x)/(15) "cos" 96 pi t . Here x and y are expressed in cm and t in s . What will be the maximum displacement of a particle at the position x = 5 cm ?

(dy)/(dx) - 3y cot x = sin 2x, y = 2 when x = (pi)/(2)

The line y=x+lambda is tangent to the ellips 2x^2+3y^2=1 Then lambda is