Two stratched strings of same material are vibrating
under some tension in fundamental mode. The ratio
of their froquencies is ` 1 : 2` and ratio of the length of
the vibrating segments is ` 1: 4` Then, the ratio of the
radii of the strings is

Two stretched strings of same material are vibrating under the force vibration having sae tension in fundamental mode. The ratio of their frequencies is 1:4 and ratio of the length of the vibrating segments is 1:8 the, the ratio of the radii of the strings is

Two strings of the same length and material are stretched under the same tension . If the ratio of their diameters is 4 : 3 , what is the ratio of the frquencies of their fundamental tones ?

Two vibrating strings of same material stretched under same tension and vibrating with same frequency in the same overtone have radii 2r and r. Then the ratio of their lengths is:

Two vibrating strings of same material stretched under same tension and vibrating with same frequency in the same overtone have radii 2r and r. Then the ratio of their lengths is:

Two vibrating strings of same material stretched under same tension and vibrating with same frequency in the same overtone have radii 2r and r. Then the ratio of their lengths is:

Two unifrom strectched strings A and B, made of steel, are vibrating under the same tension. If the first overtone of A is equal to the second overtone of B and if the radius of A is twice that of B, the ratio of the lengths of the strings is

Two strings of same material are stretched to the same tension . If their radii are in the ratio 1:2 , then respective wave velocities in them will be in ratio

Two strings of same material are stretched to the same tension . If their radii are in the ratio 1:2 , then respective wave velocities in them will be in ratio

Two uniform strings A and B made of steel are made to vibrate under the same tension. If the first overtone of A is equal to the second overtone of B and if the radius of A is twice that of B , the ratio of the lengths of the strings is