4. Two resistors R1 and R2, when connected in series; their equivalent is 20 Ω , and when connected in parallel; their equivalent is 4.8 Ω. What are the values of R1 and R2?
Philomel
a+b=20
1/a+1/b=1/4.8ab=20*4.8=96
a b ab a+b
10 10 1009 96/9=9.667 19.6678 96/8= 12 20
a=8 b=12a=12 b=8
good problem
WolframAlpha gives the same answer.
oubaas
R1+R2 = 20 ohm
R2 = (20-R1)
4.8 = R1*R2/(R1+R2)
4.8*20 = R1*(20-R1)
96-20R1+R1^2 = 0
R1 = (20+√ 20^2-96*4)/2 = 12.0 ohm
R2 = (20-√ 20^2-96*4)/2 = 8.0 ohm
check
R1+R2 = 12+8 = 20 ...OK
R1 // R2 = R1*R2 / (R1+R2) = (12*8)/20 = 96/20 = 4.8 ....OK
oldschool
R1R2/(R1+R2) = 4.8 but (R1+R2) = 20
R1R2/20 = 4.8 so R1R2 = 96
Two equations and two unknowns
R2 = 20 - R1
Substitute into R1R2 = 96
R1(20-R1) = 96
-R1²+20R1 - 96 = 0 multiply by -1
R1² -20R1 + 96 = 0
(R1-8)(R1-12) = 0 so R1 = 8 and R2 = 12
Check: 8*12/(8+12) = 96/20 = 4.8Ω Checks
billrussell42
x + y = 20 Ω
xy / (x+y) = 4.8
x = 20 – y
xy / (x+y) = 4.8
(20 – y)y / (20) = 4.8
20y – y² = 96
y² – 20y + 96 = 0
y = 12 or 8
x = 12 or 8
ans, 8 and 12 Ω
Morningfox
x + y = 20
1/x + 1/y = 1/4.8
Solve for x and y.