Question

A rod with density δ(x)=4+sin(x) (in mass per unit length) lies on the x-axis between x=0...

A rod with density δ(x)=4+sin(x) (in mass per unit length) lies on the x-axis between x=0 and x=2π/3. Find the center of mass of the rod.

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
A rod with density δ(x)=2+sin(x) (in mass per unit length) lies on the x-axis between x=0...
A rod with density δ(x)=2+sin(x) (in mass per unit length) lies on the x-axis between x=0 and x=π/3. Find the center of mass of the rod.
A thin, 1-dimensional, uniform rod of mass M and length L lies on the x axis...
A thin, 1-dimensional, uniform rod of mass M and length L lies on the x axis with one end at the origin. (a) Find its moment of inertia tensor about the origin. (b) Find the moment of inertia tensor if the rod’s center is located at the origin.
A rod of length 10 meters and charge .6 μC lies along the x-axis from (-5,...
A rod of length 10 meters and charge .6 μC lies along the x-axis from (-5, 0) to (5, 0) meters. A charge of .4 μC is placed at (0, 3) meters. a) Find the electric potential energy of the system if the rod has a uniform charge density. b) Find the energy if the rod has a linear charge density given by λ = kx2. c) Find the answer to (a) and (b) if the .4 μC charge was...
If ρ(x,y) is the density of a wire (mass per unit length), then m=∫Cρ(x,y)ds is the...
If ρ(x,y) is the density of a wire (mass per unit length), then m=∫Cρ(x,y)ds is the mass of the wire. Find the mass of a wire having the shape of a semicircle x=1+cos(t),y=sin(t), where t is on the closed interval from 0 to π, if the density at a point P is directly proportional to the distance from the y−axis and the constant of proportionality is 3. Round in the tenths place.
A rod of length 2l lies on the x-axis from x = −l to x =...
A rod of length 2l lies on the x-axis from x = −l to x = +l. The left half of the rod carries uniform negative charge density −λ while the right half carries a uniform positive charge density +λ. (a) What is the net charge of each half of the rod? What is the total charge of the entire rod? (b) Determine an exact expression for the magnitude of the electric field at an arbitrary point along the x-axis...
A thin rod of length l and uniform charge per unit length λ lies along the...
A thin rod of length l and uniform charge per unit length λ lies along the x axis as shown figure. (a) Show that the electric field at point P, a distance y from the rod, along the perpendicular bisector has no x component and is given by E=(2kλsinθ0)/y. (b) Using your result to (a), show that the field of a rod of infinite length is given by E=2kλ/y.
6) A rod with length "l" is lied along x-axis. The charge density of the rod...
6) A rod with length "l" is lied along x-axis. The charge density of the rod is "a". Calculate the potential of the rod for a the point p on x-axis. 7) A rod with length "l" is lied along x-axis. The charge density of the rod is "a". Calculate the Electric field of the rod for a point p on x-axis.
Calculate the center of mass of a nonuniform rod of length L, whose linear density is...
Calculate the center of mass of a nonuniform rod of length L, whose linear density is p(x) = p0√x ​and the moment of inertia for this rod when the axis of rotation is located at the lighter end.
A long thin rod lies on the x axis with one end at the origin and...
A long thin rod lies on the x axis with one end at the origin and the other at the 4 cm point. It has a uniform linear charge density of 125 nano C/m. Find the E field due to this rod at the 52 cm position on the x axis. Find the force exerted by the rod on a point charge of 5 micro coulombs placed at a position of 109 cm on the x axis if the rod...
The linear density (lamda) of a thin rod varies with position x as (lamda)=lamda0(x^3/L^3). The rod...
The linear density (lamda) of a thin rod varies with position x as (lamda)=lamda0(x^3/L^3). The rod lies along the X axis. If M is the mass of the rod and L is the total length, then, a) Find lamda0 in terms of M and L b)Find the position of the centre of mass c)Find the moment of inertia around the centre of mass. d) Now imagine the same thin rod is attached to a hinge that is allowed to rotate....
ADVERTISEMENT
Need Online Homework Help?

Get Answers For Free
Most questions answered within 1 hours.

Ask a Question
ADVERTISEMENT