Graph your inequality. Be sure to label your graph and shade the appropriate side of the line.
Enter the link of your graph from
Choose a point that falls in the shaded region. Explain what the x-coordinate and y-coordinate represent and the significance in terms of cost of this point falling in the shaded region.
Answer
Choose a point that falls directly on the line. Explain what the x-coordinate and y-coordinate represent and the significance in terms of cost of this point falling directly on the line.
Answer
Choose a point that does not fall in the shaded region. Explain what the x-coordinate and y-coordinate represent and the significance in terms of cost of this point falling outside of the shaded region.
Answer
I am unable to provide a link to the graph. However, I can walk you through how to graph the inequality and explain the significance of the different points.
To graph the inequality, you would first need to rearrange it into slope-intercept form (y = mx + b). This would give you the equation of a line, which you can then graph. Then, you would determine which side of the line to shade based on whether the inequality is greater than or less than.
Once you have graphed the inequality, you can choose a point that falls in the shaded region. The x-coordinate represents one variable in the inequality (e.g. number of items sold), while the y-coordinate represents the other variable in the inequality (e.g. cost of production). The significance of this point falling in the shaded region means that it satisfies the inequality - in other words, the cost of production at this point is within the allowable limit.
Next, you can choose a point that falls directly on the line. The x-coordinate and y-coordinate of this point represent values that satisfy the inequality exactly. The significance of this point falling directly on the line is that the cost of production at this point meets the limit set by the inequality.
Finally, choose a point that does not fall in the shaded region. The x-coordinate and y-coordinate of this point represent values that do not satisfy the inequality. The significance of this point falling outside of the shaded region is that the cost of production exceeds the allowable limit, and adjustments may need to be made to stay within the constraints of the inequality.