Final answer:
The system of equations to determine the number of quarters (q) and nickels (n) is q + n = 20 and 25q + 5n = 260. Using the elimination method, we find there are 8 quarters and 12 nickels in the collection of 20 coins valued at $2.60.
Step-by-step explanation:
To find the number of quarters and nickels in a collection of coins that together are valued at $2.60, we can set up and solve a system of equations. Let's denote the number of quarters as q and the number of nickels as n.
The two equations to represent the situation are:
The total number of coins equation: q + n = 20
The total value equation in cents: 25q + 5n = 260
To solve this system of equations, we can use substitution or elimination method. Here, we will use the elimination method:
Multiply the first equation by 5 to align the nickel values: 5q + 5n = 100
Subtract this new equation from the total value equation: (25q + 5n) - (5q + 5n) = 260 - 100 which simplifies to 20q = 160
Divide by 20 to solve for q: q = 160 / 20 which simplifies to q = 8
Substitute q = 8 back into the first equation: 8 + n = 20 which simplifies to n = 12
There are 8 quarters and 12 nickels in the collection