Final answer:
To find when Emelina's and Lois's salaries will be the same, we solve the equation 42,000 + 3,800x = 55,000 + 2,100x, resulting in x equals roughly 7.647. Since we count full years, it will take 8 full years for their salaries to be equal.
Step-by-step explanation:
To determine when Emelina and Lois will have the same salary, we can set up an equation that represents the growth of their salaries over time. We'll let x be the number of years it takes for their salaries to be equal.
Emelina starts with a salary of $42,000 and gets a raise of $3,800 each year. Lois starts with a salary of $55,000 and gets a raise of $2,100 each year. We want to find the value of x when their salaries are the same.
The equation representing Emelina's salary after x years is:
Emelina's Salary = 42,000 + 3,800x
Similarly, the equation for Lois's salary after x years is:
Lois's Salary = 55,000 + 2,100x
To find when their salaries are equal, we set the two equations equal to each other and solve for x:
42,000 + 3,800x = 55,000 + 2,100x
3,800x - 2,100x = 55,000 - 42,000
1,700x = 13,000
x = 13,000 / 1,700
x = 7.647
Since x represents the number of full years, we can't have a fraction of a year. Therefore, it will take 8 full years for Emelina's salary to equal Lois's salary.