A tay company uses the linear model \( y=2 x+350 \) to predict the decline sales of a toy after it has been \( n \) the Harket more than one year. of \( x \) is the number of montlu after st year and y is the number of as sold in hundreds durng that month ow many toys will be sold il month fter the first year?

To find out how many toys will be sold in the month after the first year, we need to substitute the value of \( x \) into the linear model \( y = 2x + 350 \) and solve for \( y \). Given: - The linear model is \( y = 2x + 350 \). - \( x \) represents the number of months after the first year. - We want to find the number of toys sold in the month after the first year, which is \( y \). Substitute \( x = 1 \) into the linear model to find the number of toys sold in the month after the first year: \[ y = 2(1) + 350 \] Now, let's calculate the value of \( y \) to determine how many toys will be sold in the month after the first year. Calculate the value by following steps: - step0: Calculate: \(2\times 1+350\) - step1: Multiply: \(2+350\) - step2: Add the numbers: \(352\)