You have 22 coins, dimes and nickels. If the number of dimes and nickels were reversed, you would have $0.40 less than you actually have. How many dimes and nickels do you have?
The coins differ in value by 5¢, so swapping the numbers of them will change the value by 5¢ for each unit difference in the numbers of coins. Since 40¢ = 8 * 5¢ there must be 8 more dimes than nickels.
There are (22 +8)/2 = 15 dimes and 7 nickels.
_____ You could write some equations for this problem. Let n, d represent numbers of nickels and dimes. .. n +d = 22 .. 10d +5n - (10n +5d) = 40 . . . . . . . cents .. 5(d -n) = 40 . . . . . . . . . . . . . . . . . . reversing the coin count changes the total by 5 cents for each unit of difference (d -n), as stated above. .. d -n = 8 . . . . . . . . . . . . . . . . . . . . . . divide the preceding equation by 5 Adding this last equation to the first gives .. 2d = 22 +8 .. d = 30/2 = 15 .. n = 22 -15 = 7 There are 15 dimes and 7 nickels.
