twice the tension and twice the density of another string 2. The relation between the fundamental frequencies of 1 and 2 is

Sahay Sir > Question Answers > twice the tension and twice the density of another string 2. The relation between the fundamental frequencies of 1 and 2 is
Equations of a stationary wave and a travelling wave are y1=a sin kxcos ωt and y2 =a sin(ωt−kx). The phase difference between two points x1 = 3k/π and x2= 2k/3π are ϕ1 and ϕ2 respectively for the two waves. Find the ratio ϕ2/ϕ1 is
26
Jun
Equations of a stationary wave and a travelling wave are y1=a sin kxcos ωt and y2 =a sin(ωt−kx). The phase difference between two points x1 = 3k/π and x2= 2k/3π are ϕ1 and ϕ2 respectively for the two waves. Find the ratio ϕ2/ϕ1 is String 1 has twice the length twice the radius twice the [...]
Posted in: Arihant Physics by D.C Pandey , Chapter 17 - Wave Motion , Volume 2 ,
Tags: String 1 has twice the length , twice the radius , twice the tension and twice the density of another string 2. The relation between the fundamental frequencies of 1 and 2 is ,
String 1 has twice the length, twice the radius, twice the tension and twice the density of another string 2. The relation between the fundamental frequencies of 1 and 2 is
26
Jun
String 1 has twice the length, twice the radius, twice the tension and twice the density of another string 2. The relation between the fundamental frequencies of 1 and 2 is String 1 has twice the length twice the radius twice the tension and twice the density of another string 2. The relation between the [...]
Posted in: Arihant Physics by D.C Pandey , Chapter 17 - Wave Motion , Volume 2 ,
Tags: String 1 has twice the length , twice the radius , twice the tension and twice the density of another string 2. The relation between the fundamental frequencies of 1 and 2 is ,