Application of Systems of Equations - Set Up
The sum of the digits of a two digit number is 14. The difference between the tens digit and the units digit is 2. If x is the tens digit and y is the ones digit, which system of equations represents the word problem?
x + y = 14 and x - y = 2
Mr. Rose spent $63 for a sport jacket and a pair of slacks. If the jacket cost $33 more than the slacks, how much did he pay for each? Which system of equations represents the word problem if j is the jacket price and s is the price of the slacks?
j + s = 63 and j - s = 33
One number is twice another number and their sum is 36. Which system of equations represents the word problem?
x + y = 36 and y = 2x
A man bought 42 stamps, some 13¢ and some 18¢. How many of each kind did he buy if the cost was $6.66? If x represents the number of 13 cent stamps and y the 18 cent stamps, which system represents the problem?
x + y = 42 and 0.13x + 0.18y = 6.66
The sum of two numbers is 62 and their difference is 16. Which system of equations represents the word problem?
x + y = 62 and x - y = 16
The sum of two consecutive numbers is 77. The difference of half of the smaller number and one-third of the larger number is 6. If x is the smaller number and y is the larger number, which two equations represent the sum and difference of the numbers?
x + y = 77 and 1/2 x - 1/3 y = 6
One of two complementary angles is 8 degrees less than the other. Which of the following systems of equations represents the word problem?
x + y = 90 and x - y = 8
The larger of two numbers exceeds twice the smaller by one. Three times the smaller exceeds the larger by six. If y is the larger number, which of the following systems of equations represents the word problem?
y = 2x + 1 and y + 6 = 3x
One number is 3 more than another and their sum is 41. Which of the following systems of equations represents the word problem?
y = x + 3 and x + y = 41
John is 5 years older than Mary. In 10 years, twice John's age decreased by Mary's age is 35, and John's age will be twice Mary's current age. Find their ages now. If x is Mary's age now and y is John's age now, which system of equations could not be used to solve the problem?
y = x + 5 and 2(y + 10) = x
