The following equation expresses a relationship in terms of one variable. However, you are asked to rewrite the equation in terms of a different variable.
E=I×R
E=460volts
R=92ohms
I=?
E=L X R
460 = L X 92
L= 460/92 = 5 amps
Well, if we have E = I × R, and we know E is 460 volts and R is 92 ohms, then we just need to solve for I. Let's put on our algebraic thinking caps and rearrange the equation.
We can divide both sides of the equation by R:
E/R = I
Substituting the values we have:
460 volts / 92 ohms = I
So, I = 5 amps. Ta-da!
To rewrite the equation in terms of a different variable, let's rewrite the equation E = I × R, where E = 460 volts and R = 92 ohms.
Replacing E with 460 volts and R with 92 ohms, we have:
460 = I × 92
To solve for I, divide both sides of the equation by 92:
460/92 = I × 92/92
Simplifying further:
5 = I
Therefore, the value of I is 5 amperes.
To rewrite the equation in terms of a different variable, we need to solve for the unknown variable (in this case, I).
Given:
E = 460 volts
R = 92 ohms
The equation E = I × R represents Ohm's Law, where E is the voltage, I is the current, and R is the resistance. We are given the values for E and R and need to solve for I.
To find I, we can rearrange the equation as follows:
E = I × R
Divide both sides of the equation by R:
E/R = I
Now, substitute the given values into the equation:
I = E/R
I = 460 volts / 92 ohms
I = 5 amps
Therefore, the current (I) is equal to 5 amps.