[" Ques "1." The transverse displacement "],[y(x,t)" of a wave on a string is given by "],[y(x,t)=e^(-(ax^(2)+bt^(2)+2sqrt(abxt)))" .This "],[" represnts a "]

The transverse displacement y(x, t) of a wave on a string is given by y(x, t)= e ^(-(ax^(2) + bt^(2) + 2sqrt((ab))xt) . This represents a :

The transverse displacement y(x, t) of a wave on a string is given by y(x, t)= e ^(-(ax^(2) + bt^(2) + 2sqrt((ab))xt) . This represents a :

The transverse displacement y(x, t) of a wave on a string is given by y(x, t)= e ^(-(ax^(2) + bt^(2) + 2sqrt((ab))xt) . This represents a :

The transverse displacement y(x, t) of a wave on a string is given by y(x, t)= e ^(-(ax^(2) + bt^(2) + 2sqrt((ab))xt) . This represents as : Wave moving along + x-axis with a speed sqrt((a)/(b)) Wave moving along - x-axis with speed sqrt((b)/(a)) Standing wave of frequency sqrt (b) Standing wave of frequency (1)/(sqrt (b))

The transverse displamcement y(x,t) of a wave y(x,t ) on a string is given by yox, t) = . This represents a

The transverse displacement of a string is given by y ( x , t ) = 0.06 sin ((2pi)/(3)) x cos ( 120 pi t) where 'x' & 'y' are 'm' and 't' is s. The length of the string is 1.5m and its mass is 3.0 xx 10^(-2) kg . Determine the tension in the string.