Answer:
The power dissipated is 45W.
Step-by-step explanation:
The power [tex]P[/tex] varies jointly with resistance [tex]R[/tex], and the square of current [tex]I[/tex]:
[tex]P = \alpha I^2R[/tex],
where [tex]\alpha[/tex] is the constant of proportionality.
Now we are told that when [tex]R = 15\Omega[/tex] and [tex]I =1A[/tex], [tex]P = 15W[/tex]:
[tex]15 = \alpha (1A)^2*15\Omega[/tex]
solving for [tex]\alpha[/tex] we get
[tex]\alpha = 1[/tex],
which gives
[tex]P = I^2R[/tex]
With the value of [tex]\alpha[/tex] in hand, we find the power dissipated when [tex]R =5\Omega[/tex] and [tex]I = 3 A:[/tex]
[tex]P = (3A)^2(5\Omega )[/tex]
[tex]\boxed{P =45W}[/tex]
Thus, the power dissipated is 45W.
