Q: What was bjorn borg's string tension?

Write your answer...

Submit

Still have questions?

Related questions

the force apply on string it vibrate this vibration is called tension of the string

The tension of the string. Less tension = lower pitch. This can be achieved by loosening the string or lengthening the string.

Margret Borgs was born in 1909.

apply the formula of tension

The tension in any part of the string is equal to the force that pulls the string at the ends (assuming for simplicity that the string is basically weightless).

The speed of the standing waves in a string will increase by about 1.414 (the square root of 2 to be more precise) if the tension on the string is doubled. The speed of propagation of the wave in the string is equal to the square root of the tension of the string divided by the linear mass of the string. That's the tension of the string divided by the linear mass of the string, and then the square root of that. If tension doubles, then the tension of the string divided by the linear mass of the string will double. The speed of the waves in the newly tensioned string will be the square root of twice what the tension divided by the linear mass was before. This will mean that the square root of two will be the amount the speed of the wave through the string increases compared to what it was. The square root of two is about 1.414 or so.

Nervous tension: "The tension from waiting for the jury to give its verdict was giving me a headache."Physical tension: "If you overtighten the guitar string, the tension will be so great the string will snap."

A string under tension has potential energy, which will be liberated as kinetic energy should the string break or be released.

The speed of the standing waves in a string will increase by about 1.414 (the square root of 2 to be more precise) if the tension on the string is doubled. The speed of propagation of the wave in the string is equal to the square root of the tension of the string divided by the linear mass of the string. That's the tension of the string divided by the linear mass of the string, and then the square root of that. If tension doubles, then the tension of the string divided by the linear mass of the string will double. The speed of the waves in the newly tensioned string will be the square root of twice what the tension divided by the linear mass was before. This will mean that the square root of two will be the amount the speed of the wave through the string increases compared to what it was. The square root of two is about 1.414 or so.

increase the length of the string means decrease the tension in the string, therefore as the tension decreases the frequency will drop due to loosen of the string.

Weight of the chain and tension in the string

The frequency of a string depends on its length, linear density, and tension. Most musical instruments are designed to make it easy to quickly change the tension; this will tune the instrument, or rather, the corresponding string.