Also find the value of y when x=11 and value of x when y=10.

To solve the problem, we need to find the values of \( y \) when \( x = 11 \) and \( x \) when \( y = 10 \). Let's assume we have a relationship between \( x \) and \( y \) that we can use to find these values. ### Step 1: Write down the relationship between \( x \) and \( y \) Assuming we have a linear relationship, we can express it in the form of an equation. For example, let’s say the relationship is given by: \[ y = mx + c \] where \( m \) is the slope and \( c \) is the y-intercept. However, since we don't have specific values for \( m \) and \( c \), we need to assume or derive them from given information. ### Step 2: Find \( y \) when \( x = 11 \) Using the assumed relationship: 1. Substitute \( x = 11 \) into the equation. 2. Calculate \( y \). For example, if we assume \( y = 2x + 3 \): \[ y = 2(11) + 3 = 22 + 3 = 25 \] So, when \( x = 11 \), \( y = 25 \). ### Step 3: Find \( x \) when \( y = 10 \) Now, we need to find \( x \) when \( y = 10 \): 1. Substitute \( y = 10 \) into the equation. 2. Solve for \( x \). Continuing with our example equation \( y = 2x + 3 \): \[ 10 = 2x + 3 \] Subtract 3 from both sides: \[ 7 = 2x \] Now, divide by 2: \[ x = \frac{7}{2} = 3.5 \] ### Conclusion Thus, the values are: - When \( x = 11 \), \( y = 25 \). - When \( y = 10 \), \( x = 3.5 \).