Final answer:
The price of a large poster is $6.1875, and the price of a small poster is $2.625, found by setting up and solving a system of linear equations.
Step-by-step explanation:
We have two equations based on the information provided:
- Han paid $15 for 2 large posters and 1 small poster: 2x + y = 15
- Kiran paid $18 for 1 large poster and 4 small posters: x + 4y = 18
To find the price of a large poster (x) and the price of a small poster (y), we can use these two equations to set up a system of linear equations and solve for x and y.
Step-by-Step Solution:
- Multiply the second equation by 2 to eliminate y when added to the first equation:
2(x + 4y) = 2(18)
2x + 8y = 36 - Add the first equation to the new form of the second equation:
2x + y + 2x + 8y = 15 + 36
4x + 9y = 51 - Subtract the original first equation from this new equation:
(4x + 9y) - (2x + y) = 51 - 15
2x + 8y - 2x - y = 36 - 15
8y = 36 - 15
8y = 21 - Now, solve for y:
y = 21/8
y = 2.625 - Use the value of y to solve for x in one of the original equations:
2x + 2.625 = 15
2x = 15 - 2.625
2x = 12.375 - Solve for x:
x = 12.375/2
x = 6.1875
Therefore, the price of a large poster (x) is $6.1875, and the price of a small poster (y) is $2.625.