1.A wave propagates in a string in the positive xxx-direction with velocity vvv. The shape of the string at t=t0t = t_0t=t0 is given by f(x,t0)=Asin(x/a)f(x, t_0) = A\sin(x/a)f(x,t0)=Asin(x/a). Then the wave equation at any instant ttt is given bya.g(x,t)=Asin (x−v(t−t0)a)g(x,t) = A\sin\!\left(\dfrac{x - v(t - t_0)}{a}\right)g(x,t)=Asin(ax−v(t−t0))b.g(x,t)=Asin (x+v(t−t0)a)g(x,t) = A\sin\!\left(\dfrac{x + v(t - t_0)}{a}\right)g(x,t)=Asin(ax+v(t−t0))c.g(x,t)=Asin (x−v(t+t0)a)g(x,t) = A\sin\!\left(\dfrac{x - v(t + t_0)}{a}\right)g(x,t)=Asin(ax−v(t+t0))d.g(x,t)=Asin (x+v(t+t0)a)g(x,t) = A\sin\!\left(\dfrac{x + v(t + t_0)}{a}\right)g(x,t)=Asin(ax+v(t+t0))Login to continueOnly logged in users canattempt or see the solution.