Asked by Kid
A long thin rod lies along the x-axis from the origin to x=L, with L= 0.830 m. The mass per unit length, $\lambda$ (in kg/m) varies according to the equation $ \lambda = \lambda_0 (1+1.110x^3). The value of $\lambda_0$ is 0.200 kg/m and x is in meters. Calculate the total mass of the rod.
- So I tried:
lambda = m/x
m = (lambda)(x)
= (0.200kg/m)(0.830m)
= 0.166kg
...which was apparently wrong so then I retried this time using the given equation:
$ \lambda = \lambda_0 (1+1.110x^3).
= (0.200kg/m)(1+(1.110)(0.830m)^3)
= 0.271kg
But that is also incorrect and I don't know what else to do.
- So I tried:
lambda = m/x
m = (lambda)(x)
= (0.200kg/m)(0.830m)
= 0.166kg
...which was apparently wrong so then I retried this time using the given equation:
$ \lambda = \lambda_0 (1+1.110x^3).
= (0.200kg/m)(1+(1.110)(0.830m)^3)
= 0.271kg
But that is also incorrect and I don't know what else to do.
Answers
Answered by
Scott
this is integral calculus
the mass of a segment of the rod is
... segment length * lambda
lambda = .200 (1 + 1.110 x^3)
... = .200 + .222 x^3
segment length is dx
integrate from x = 0 to .83
.200 dx + .222 x^3 dx ... sum the two integrals
.166 + .026
the mass of a segment of the rod is
... segment length * lambda
lambda = .200 (1 + 1.110 x^3)
... = .200 + .222 x^3
segment length is dx
integrate from x = 0 to .83
.200 dx + .222 x^3 dx ... sum the two integrals
.166 + .026
Answered by
Jason
I have no idea because I'm not in your grade. SORRY!
Answered by
Saugat
dM=dx(0.200*(1+1.110x^3))
taking integral on both sides,
M=0.200(L+1.110*x^4/4)
put L=0.830
M=0.19234
taking integral on both sides,
M=0.200(L+1.110*x^4/4)
put L=0.830
M=0.19234
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