Answer :
Answer:
power is 35.5 W
power is 1.06 W
power is 1.06 W
Explanation:
Given data
R = 23.5 Ω
L = 396 mH
C = 49.5 μF
voltage = 29 V
solution
we know that in 1st part power that is equal to square of current × R
so
power = I²R
so current I = V/Z = 29/23.5 because R = Z at resonance
current = 1.23 A
power = 1.23²×23.5
power = 35.5 W
and
in 2nd part we know that frequency that is
f = 1/2π × √(1/LC)
f = 1/2(3.14) × √(1/396×10^-3×49.5×10^-6)
f = 35.94 Hz
so power = I²R
here
I = V/Z
Z = √( R² + (x - y)²)
x = 2π(2f) L
x = 2(3.14)× ( 2×35.94)×( 396×[tex]10^{-3}[/tex]
x = 178.84 ohm
y = 1 / 2π(2f) C
y = 1 / 2(3.14)× ( 2×35.94)×( 49.5×[tex]10^{-6}[/tex]
y = 44.73 ohm
so
Z = √( 23.5² + (178.84 - 44.73)²)
Z = 136.15 ohm
so current = 29 / 136.15
current I = 0.212 A
so power = 0.212² / 136.15
power = 1.06 W
and
in 3rd part same like 2nd
frequency = 35.94 Hz and X = 2π(2f) L = 2(3.14)× ( 35.94/2)×( 396×[tex]10^{-3}[/tex]
X = 44.71 ohm
Y = 1 / 2π(2f) C = 1 / 2(3.14)× ( 35.94/2)×( 49.5×[tex]10^{-6}[/tex]
Y = 178.98 ohm
so Z = √( 23.5² + (44.71 - 178.98)²)
Z = 136.25 ohm
current = 29 / 136.25
current = 0.212 A
so power = 0.212² / 136.15
power = 1.06 W
