what is the maximum torque on a rectangular coil 5 cm x 12 cm and with 600 turns when carrying a current of 0.0700A in a uniform field with magnitude 0.300T?

torque=nBIA

=600*10^-5*0.1*5*12*10^-4
=3.6*10^-6 ANSWER

Give me and plz.

To find the maximum torque on a rectangular coil, we can use the formula:

τ = n * A * B * sin(θ)

Where:
τ is the torque,
n is the number of turns,
A is the area of the coil,
B is the magnitude of the magnetic field, and
θ is the angle between the magnetic field and the normal to the coil.

First, let's calculate the area of the coil:

A = length * width
= 5 cm * 12 cm
= 60 cm²

Now, we can calculate the torque:

τ = n * A * B * sin(θ)
= 600 turns * 60 cm² * 0.300 T * sin(90°)
= 10800 cm² * T

Converting cm² to m², we have:

τ = 10800 cm² * T
= 1.08 m² * T

Therefore, the maximum torque on the rectangular coil is 1.08 times the magnitude of the magnetic field, or simply 1.08 T.

To determine the maximum torque on a rectangular coil, we can use the formula:

τ = N * B * A * sinθ

Where:
τ is the torque (in Nm),
N is the number of turns,
B is the magnetic field strength (in Tesla),
A is the area of the coil (in square meters),
θ is the angle between the magnetic field and the normal to the plane of the coil.

In this case, we have a rectangular coil with dimensions of 5 cm x 12 cm and 600 turns, carrying a current of 0.0700A in a uniform magnetic field with a magnitude of 0.300T. However, we need to find the maximum torque, so we need to determine the angle θ.

Since the coil is rectangular and the field is uniform, we can assume that the angle θ is 90 degrees (cosθ = 0). Therefore, sinθ = 1.

First, we need to convert the dimensions of the coil from centimeters to meters:

Length (l) = 5 cm = 0.05 m
Width (w) = 12 cm = 0.12 m

Next, we calculate the area of the coil:

A = l * w = 0.05 m * 0.12 m = 0.006 m^2

Now we can calculate the maximum torque:

τ = N * B * A * sinθ
= 600 * 0.300 T * 0.006 m^2 * 1
= 0.108 Nm

Therefore, the maximum torque on the rectangular coil is 0.108 Nm when carrying a current of 0.0700A in a uniform magnetic field with a magnitude of 0.300T.