When a mass of 40 g is attached to a vertically hanging spring it extends by 0.4 cm. Find : (See lesson 13) (i) Force constant of the spring. (ii) The extension when 100 g weight is attached to it. (iii) The time period of oscillation of 100 g weight on it. (iv) The time period and force constant if the spring is cut in three equal parts and 100 g weight is made to oscillate on one part.
Answers
Answered by
20
Ans 1 ) force constant of the spring -:
F=mg
mass = 40 gram
F= (40/1000 )* 10
f=0.4 N
F= kx
k=spring constant x= elongation in the spring = 0.4 *10^-2
0.4= k *0.4 ^10-2
k=1/10^-2 = 100
Ans 2 the extention when 100 gram weight is attached to it then -:
f= (mg)
f=(100)*10/1000
f=1000/1000= 1 N
f=kx
k= 100 we already find the value of k only we need to find x then
1 =100 x
x=10^-2 ans
Ans 3) we need to calculate its time period then use the formula and the values we find
time period of the ossilation is = T=2π√m/k
M = 100 GRAM K = 100
t=2π√0.1/100 ANS
Ans 4 ) now time period is divided by three and k divided by 3
means T/3 = √0.1*3/100
F=mg
mass = 40 gram
F= (40/1000 )* 10
f=0.4 N
F= kx
k=spring constant x= elongation in the spring = 0.4 *10^-2
0.4= k *0.4 ^10-2
k=1/10^-2 = 100
Ans 2 the extention when 100 gram weight is attached to it then -:
f= (mg)
f=(100)*10/1000
f=1000/1000= 1 N
f=kx
k= 100 we already find the value of k only we need to find x then
1 =100 x
x=10^-2 ans
Ans 3) we need to calculate its time period then use the formula and the values we find
time period of the ossilation is = T=2π√m/k
M = 100 GRAM K = 100
t=2π√0.1/100 ANS
Ans 4 ) now time period is divided by three and k divided by 3
means T/3 = √0.1*3/100
Similar questions