nominal radius a = 5 cm, and N = 400 laps. In portal operation I =
12 A. The value z = 0 represents the midpoint of the solenoid.
1.1 (3%) Make a representative and practical diagram of this
solenoid with a measurement scale where somehow explain all the
above data. Include the values of B obtained later in the
center of the solenoid and on the two outputs.
1.2 (14 %) Plot |H(z)| as a function of z along the axis of the
solenoid for the range 20 cm ≤ z ≤ 20 cm in
steps of 5 cm. For this, a series of data and formulas for analysis
are provided.
It defines: z/(z^2+a^2)^(1/2)=sinθ
The result is generalized to an arbitrary observation point z'
on the axis of the solenoid:
- A Solenoid With 1 024 Mm Diameter Wire Has Length L 20 45 Cm Nominal Radius A 5 Cm And N 400 Laps In Portal Ope 1 (23.98 KiB) Viewed 43 times
there is symmetry. Make a graph of the magnitude H (0, 0 z´) as a
function of z´, where n = N/l is the density of turns (in turns/m).
Units of H must be kA m-1 and z in m. You must keep in mind how the
magnitude varies in terms of the variable. Comment the result
considering the values of H in the two outputs of the solenoid
and in the center.
1.3 (13%) If the solenoid is in the air, plot B using the data
from the previous point. Use System International Units in force.
The units of B must be mT and z in m. Analyze the result
considering the values of B in the two outputs of the solenoid
and in the center.
= B (---)/V(2-2)2+a= sine 1/2+: 11/2 -)? + a2 V11/2+:-)2 + a2) 1/2- H(0,0,=') = - ( * + (A/m) и