Math  /  Algebra

QuestionSolve for hh in terms of EE and ff. E=hfh=\begin{array}{l} E=h f \\ h= \end{array}

Studdy Solution

STEP 1

1. The equation E=hf E = hf is a linear equation relating the variables E E , h h , and f f .
2. We are solving for h h in terms of E E and f f .
3. The variable f f is not equal to zero, as division by zero is undefined.

STEP 2

1. Understand the given equation.
2. Isolate the variable h h by performing algebraic operations.
3. Express h h explicitly in terms of E E and f f .

STEP 3

The equation E=hf E = hf represents a relationship where E E is the product of h h and f f .

STEP 4

To solve for h h , we need to isolate it on one side of the equation. Since h h is multiplied by f f , we will divide both sides of the equation by f f :
h=Ef h = \frac{E}{f}

STEP 5

Now, h h is expressed in terms of E E and f f :
h=Ef h = \frac{E}{f}
This is the solution for h h in terms of E E and f f .

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