In the circuit shown below . calculate the value of x if the equivalent resistance between the point A and B is 4ohm
Answers
Answer:
the value of x is 1 Ω
Explanation:
Given,
Equivalent resistance between A and B is 4Ω.
in the given figure,
4Ω and 8Ω resistors are in series,
so, Req = ( 4 + 8)Ω = 12Ω
also, x Ω and 5Ω resistors are in series,
so, Req = (x + 5) Ω
and, now, 12 Ω and (x + 5) ohm resistors are in parallel.
then, 1/Req =1/12 + 1 / (x + 5)
or, 1 / 4 = 1 / 12 + 1 / (x + 5)
or, 1 / 4 = [(x+5) + 12] / 12(x+5)
or, 1 / 4 = (x + 17) / (12x + 60)
or, 12x + 60 = 4(x + 17)
or, 12x + 60 = 4x + 68
or, 12x - 4x = 68 - 60
or, 8x = 8
or, x = 1 Ω
Therefore, the value of x is 1 Ω.
Given,
- Equivalent resistance
between A and B is 4Ω.
in the given figure,
- 4Ω and 8Ω resistors are in series,
so, Req = ( 4 + 8)Ω = 12Ω
also, x Ω and 5Ω resistors are in series,
so, Req = (x + 5) Ω
and, now, 12 Ω and (x + 5) ohm resistors are in parallel.
then, 1/Req =1/12 + 1 / (x + 5)
or, 1 / 4 = 1 / 12 + 1 / (x + 5)
or, 1 / 4 = [(x+5) + 12] / 12(x+5)
or, 1 / 4 = (x + 17) / (12x + 60)
or, 12x + 60 = 4(x + 17)
or, 12x + 60 = 4x + 68
or, 12x - 4x = 68 - 60
or, 8x = 8
or, x = 1 Ω
- Therefore, the value of x is 1 Ω.