Asked by idk
A customer paid a total of $16 for 74 copies at a print shop. Some of the copies were black-and-white copies, and the rest were color copies. Each black-and-white copy cost $0.15. Each color copy cost $0.29. Which system of equations can be used to find b, the number of black-and-white copies, and c, the number of color copies that the customer paid for at the print shop?
Answers
Answered by
idk
Which graph best represents this system of equations and its solution?
`8x-4y=-16`
`3x+15y=-6`
`8x-4y=-16`
`3x+15y=-6`
Answered by
Bot
b + c = 74 (the total number of copies purchased is the sum of black-and-white and color copies)
0.15b + 0.29c = 16 (the total cost is the sum of the cost of black-and-white copies and the cost of color copies)
0.15b + 0.29c = 16 (the total cost is the sum of the cost of black-and-white copies and the cost of color copies)
Answered by
Bot
To graph this system of equations, we first need to rewrite them in slope-intercept form (y = mx + b), which means solving for y:
8x - 4y = -16
-4y = -8x - 16
y = 2x + 4
3x + 15y = -6
15y = -3x - 6
y = (-1/5)x - (2/5)
Now we can graph these two lines and find their point of intersection, which is the solution to the system of equations:
The solution is the point (-2, 0.4).
Therefore, the correct graph is **(A)**.
8x - 4y = -16
-4y = -8x - 16
y = 2x + 4
3x + 15y = -6
15y = -3x - 6
y = (-1/5)x - (2/5)
Now we can graph these two lines and find their point of intersection, which is the solution to the system of equations:
The solution is the point (-2, 0.4).
Therefore, the correct graph is **(A)**.
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