Answer:
A certain battery can power a 100 Ohm-resistance device for 4 hours. How long can the battery power a 200 Ohm device? Ans: 8 ohms
Part B)
If you put two of these batteries in series with each other - still powering a device with the original 100 Ohm resistance - how long would the batteries last? (Note: you have two batteries now, so twice the energy to begin with than with one battery.)
t₁=8hr
t₂=2hr
Explanation:
Given that,
R₁ =100Ω
R₂ =200Ω
t₁ =4hr
Part A
The expression for energy dessipated across a resistor when it is connected with a single resistor (R) is
[tex]E = \frac{V^2}{R} t[/tex]
Here V is the voltage across the source, t is time
energy dissipated across 200ohms is the same as energy dissipated across 100ohms
[tex]E = \frac{V^2}{R} t[/tex]
[tex]\frac{V^2t_1}{R_1} = \frac{V^2t_2}{R_2}[/tex]
rearrange the above equation t₂
[tex]t_2 = \frac{R_2t_1}{R_1} \\\\= \frac{(200)(4)}{100} \\= 8hr[/tex]
[tex]t_2 = \frac{R_2t_1}{R_1} \\\\= \frac{(200)(4)}{100} \\= 8hr[/tex]
Part b
Now two batteries are in series
total emf =2V
[tex]\frac{(2V)^2t_1}{R_1} = \frac{V^2t_2}{R_2} \\\\\frac{4t_1}{R_1} = \frac{t_2}{4R_2} \\\\t_2=\frac{2(4)(100)}{4(100)} \\\\=2hr[/tex]
use the equation below
