operties of Linear Question 22, 2.1.49 HW Score: \( 26.75 \%, 6.69 \) of 25 points ppilications Pat2 of 2 Points: 0 of 1 Save The point at which a company's profits equal zero is called the company's break even point. Let R represent a company's revenue, let C represent the company's costs, and let x represent the number of units produced and sold each day. \[ \begin{array}{l} R(x)=25 x \\ C(x)=12.5 x+50,000 \end{array} \] (a) Find the fimis break even point; that is, find \( x \) so that \( R=C \). (b) Find the values of \( x \) such that \( R(x)>C(x) \). This represents the number of units that the company must sell to eam a profit. (a) \( x=4000 \) (Type a whole number.) (b) Solve the inequality for \( x \). Type the correct inequality symbol in the first answer box below, and type an integer in the second answer box. \( x \) \( \square \)

To solve the problem, we need to follow the steps outlined in the prompt. ### Given: - Revenue function: \( R(x) = 25x \) - Cost function: \( C(x) = 12.5x + 50,000 \) ### (a) Find the break-even point where \( R = C \). 1. Set the revenue equal to the cost: \[ 25x = 12.5x + 50,000 \] 2. Rearrange the equation to isolate \( x \): \[ 25x - 12.5x = 50,000 \] \[ 12.5x = 50,000 \] 3. Solve for \( x \): \[ x = \frac{50,000}{12.5} \] Now, let's calculate \( x \). ### (b) Find the values of \( x \) such that \( R(x) > C(x) \). 1. Set up the inequality: \[ 25x > 12.5x + 50,000 \] 2. Rearrange the inequality: \[ 25x - 12.5x > 50,000 \] \[ 12.5x > 50,000 \] 3. Solve for \( x \): \[ x > \frac{50,000}{12.5} \] Now, let's perform the calculations for both parts. Calculate the value by following steps: - step0: Calculate: \(\frac{50000}{12.5}\) - step1: Convert the expressions: \(\frac{50000}{\frac{25}{2}}\) - step2: Multiply by the reciprocal: \(50000\times \frac{2}{25}\) - step3: Reduce the numbers: \(2000\times 2\) - step4: Multiply the numbers: \(4000\) Calculate or simplify the expression \( 50000/12.5 \). Calculate the value by following steps: - step0: Calculate: \(\frac{50000}{12.5}\) - step1: Convert the expressions: \(\frac{50000}{\frac{25}{2}}\) - step2: Multiply by the reciprocal: \(50000\times \frac{2}{25}\) - step3: Reduce the numbers: \(2000\times 2\) - step4: Multiply the numbers: \(4000\) ### Results: (a) The break-even point is: \[ x = 4000 \] (b) The inequality for profit is: \[ x > 4000 \] ### Final Answers: - (a) \( x = 4000 \) - (b) \( x \) \( > \) \( 4000 \) This means the company must sell more than 4000 units to earn a profit.