MTG NEET Physics
In SHM amplitude of kinetic energy is 1/4th of the total energy at a displacement equal to
07
Nov
In SHM amplitude of kinetic energy is 1/4th of the total energy at a displacement equal to In SHM amplitude of kinetic energy is 1/4th of the total energy at a displacement equal to November 7, 2020 Category: Chapter 11 - SHM , MTG NEET Physics , Part 1 ,
The velocities of a body executing SHM at displacement ‘a’ and ‘b’ are ‘b’ and ‘a’ respectively. The amplitude of SHM is
07
Nov
The velocities of a body executing SHM at displacement ‘a’ and ‘b’ are ‘b’ and ‘a’ respectively. The amplitude of SHM is The velocities of a body executing SHM at displacement 'a' and 'b' are 'b' and 'a' respectively. The amplitude of SHM is November 7, 2020 Category: Chapter 11 - SHM , MTG NEET [...]
A particle executes SHM with a time period of 16s. At time t=2s, the particle crosses the mean position while at t=4s, its velocity is 4m/s . The amplitude of motion in metre is?
07
Nov
A particle executes SHM with a time period of 16s. At time t=2s, the particle crosses the mean position while at t=4s, its velocity is 4m/s . The amplitude of motion in metre is? A particle executes SHM with a time period of 16s. At time t=2s its velocity is 4m/s . The amplitude of [...]
A particle vibrating simple harmonically has an acceleration of 16cms ^−2 when it is at a distance of 4 cm from the mean position. Its time period is
07
Nov
A particle vibrating simple harmonically has an acceleration of 16cms ^−2 when it is at a distance of 4 cm from the mean position. Its time period is A particle vibrating simple harmonically has an acceleration of 16cms ^−2 when it is at a distance of 4 cm from the mean position. Its time period [...]
The simple harmonic motion of a particle is given by x=asin2πt. Then, the location of the particle from its mean position at a time 1/8th of a second is:
07
Nov
The simple harmonic motion of a particle is given by x=asin2πt. Then, the location of the particle from its mean position at a time 1/8th of a second is: the location of the particle from its mean position at a time 1/8th of a second is: the location of the particle from its mean position [...]
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the location of the particle from its mean position at a time 1/8th of a second is: ,
the location of the particle from its mean position at a time 1/8th of a second is:The simple harmonic motion of a particle is given by x=asin2πt. Then ,
The simple harmonic motion of a particle is given by x=asin2πt. Then ,
Two simple harmonic motions are represented by the equations x1=10sin(3πt+π/4) and x2 = 5(sin3πt+3–√cos3πt) their amplitude are in the ratio of
07
Nov
Two simple harmonic motions are represented by the equations x1=10sin(3πt+π/4) and x2 = 5(sin3πt+3–√cos3πt) their amplitude are in the ratio of Two simple harmonic motions are represented by the equations x1=10sin(3πt+π/4) and x2 = 5(sin3πt+3–√cos3πt) their amplitude are in the ratio of November 7, 2020 Category: Chapter 11 - SHM , MTG NEET Physics , [...]
A simple harmonic motion is represented by x(t)=sin^2ωt − 2cos^2ωt. The angular frequency of oscillation is given by
07
Nov
A simple harmonic motion is represented by x(t)=sin^2ωt − 2cos^2ωt. The angular frequency of oscillation is given by A simple harmonic motion is represented by x(t)=sin^2ωt − 2cos^2ωt. The angular frequency of oscillation is given by November 7, 2020 Category: Chapter 11 - SHM , MTG NEET Physics , Part 1 ,
The equation of motion of a particle executing simple harmonic motion is a + 16π^2x = 0 In this equation, a is the linear acceleration in m/s^2 of the particle at a displacement x in meter. The time period in simple harmonic motion is
07
Nov
The equation of motion of a particle executing simple harmonic motion is a + 16π^2x = 0 In this equation, a is the linear acceleration in m/s^2 of the particle at a displacement x in meter. The time period in simple harmonic motion is a is the linear acceleration in m/s^2 of the particle at [...]
A particle executes SHM of type x=asinωt. It takes time t1 from x = 0 to x = 2/a and t2 from x = 2/a to x = a. The ratio of t1 : t2 will be:
07
Nov
A particle executes SHM of type x=asinωt. It takes time t1 from x = 0 to x = 2/a and t2 from x = 2/a to x = a. The ratio of t1 : t2 will be: the-function-sinwt-coswt-represents-a-a-shm-with-a-period-π-ω-duplicate-3 November 7, 2020 Category: Chapter 11 - SHM , MTG NEET Physics , Part 1 ,
Let x = xmcos(wt+φ). At t = 0, x = xm. If time period is T, what is the time taken to reach x = xm/2 ?
07
Nov
Let x = xmcos(wt+φ). At t = 0, x = xm. If time period is T, what is the time taken to reach x = xm/2 ? Let x = xmcos(wt+φ). At t = 0 what is the time taken to reach x = xm/2 ? x = xm. If time period is T November [...]