Problem 9: A current passing through a resistor (R = 25 2) decreases exponentially with time as I(t) = Ioe-at where Io = 5.5 A and a = 0.15 s-l. Part (a) Calculate the energy dissipated by the resistor in joules during the first 10 seconds. E = sin() cos() tan() 7 8 9 HOME cotan() asin() acos() E 6 atan() acotan() sinh() 1 2 3 cosh() tanh() cotanh() + END O Degrees O Radians VO BACKSPACE DEL CLEAR Submit Hint Feedback I give up!
Problem 9: A current passing through a resistor (R = 25 2) decreases exponentially with time as I(t) = Ioe-at where Io = 5.5 A and a = 0.15 s-l. Part (a) Calculate the energy dissipated by the resistor in joules during the first 10 seconds. E = sin() cos() tan() 7 8 9 HOME cotan() asin() acos() E 6 atan() acotan() sinh() 1 2 3 cosh() tanh() cotanh() + END O Degrees O Radians VO BACKSPACE DEL CLEAR Submit Hint Feedback I give up!
College Physics
1st Edition
ISBN:9781938168000
Author:Paul Peter Urone, Roger Hinrichs
Publisher:Paul Peter Urone, Roger Hinrichs
Chapter20: Electric Current, Resistance, And Ohm's Law
Section: Chapter Questions
Problem 60PE: Integrated Concepts (a) What energy is dissipated by a lightning bolt having a 20,000-A current, a...
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![Problem 9: A current passing through a resistor (R = 25 2) decreases exponentially with time as I(t) = Ioe at where Io = 5.5 A and a =
0.15 s-1.
%3D
Part (a) Calculate the energy dissipated by the resistor in joules during the first 10 seconds.
E = ||
sin()
cos()
tan()
7 8 9
НOME
E 1^ AL 4 5 6
1 2 3
cotan()
asin()
acos()
atan()
acotan()
sinh()
cosh()
tanh()
cotanh()
+
END
O Degrees
Radians
VO BАСKSPАСЕ
DEL
CLEAR
Submit
Hint
Feedback
I give up!
Part (b) Calculate the total energy dissipated by the resistor in joules as time goes to infinity.](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2Fc7a2ff53-fb43-4741-8151-2a91a35a4ca9%2Fe27cca71-54b9-465f-96b4-7e271f214b9e%2Fb83npbt_processed.png&w=3840&q=75)
Transcribed Image Text:Problem 9: A current passing through a resistor (R = 25 2) decreases exponentially with time as I(t) = Ioe at where Io = 5.5 A and a =
0.15 s-1.
%3D
Part (a) Calculate the energy dissipated by the resistor in joules during the first 10 seconds.
E = ||
sin()
cos()
tan()
7 8 9
НOME
E 1^ AL 4 5 6
1 2 3
cotan()
asin()
acos()
atan()
acotan()
sinh()
cosh()
tanh()
cotanh()
+
END
O Degrees
Radians
VO BАСKSPАСЕ
DEL
CLEAR
Submit
Hint
Feedback
I give up!
Part (b) Calculate the total energy dissipated by the resistor in joules as time goes to infinity.
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