The revenue for a business, as a function of units produced, x, is shown below by R(x). C(x) represents the cost of producing x units. Calculate the profit function and then determine how many units must be produced for the business to make a profit of $1349.

To calculate the profit function \( P(x) \), we use the formula:

\[ P(x) = R(x) - C(x) \]

where \( R(x) \) is the revenue function and \( C(x) \) is the cost function.

Given:

\[ R(x) = 20x \]

\[ C(x) = x + 1463 \]

Now, substituting \( R(x) \) and \( C(x) \) into the profit function:

\[ P(x) = 20x - (x + 1463) \]

Simplifying the expression:

\[ P(x) = 20x - x - 1463 \] \[ P(x) = 19x - 1463 \]

Now we need to determine how many units must be produced for the business to make a profit of $1349. We set the profit function equal to $1349:

\[ 19x - 1463 = 1349 \]

Now we solve for \( x \):

1. Add 1463 to both sides: \[ 19x = 1349 + 1463 \] \[ 19x = 2812 \]

2. Divide by 19: \[ x = \frac{2812}{19} \] \[ x = 148 \]

Therefore, the business must produce 148 units to make a profit of $1349.