The correct method is to solve the system of equations:
b = w + 11
b = 3w − 15
Substitute the first equation into the second equation:
w + 11 = 3w − 15
Solve for w:
11 + 15 = 3w - w
26 = 2w
w = 13
Then, substitute the value of w back into the first equation to find b:
b = 13 + 11
b = 24
Therefore, Waldo is 13 years old and Betsey is 24 years old.
Betsey is 11 years older than Waldo. Betsey's age is 15 years less than three times Waldo's age. The system below models the relationship between Betsey's age (b) and Waldo's age (w):
b = w + 11
b = 3w − 15
Which of the following methods is correct to find Betsey's and Waldo's age? (4 points)
Solve w + 11 = 3w − 15 to find the value of w.
Solve b + 11 = 3b − 15 to find the value of b.
Write the points where the graphs of the equations intersect the x-axis.
Write the points where the graphs of the equations intersect the y-axis.
3 answers
a b c or d
c) Write the points where the graphs of the equations intersect the x-axis.