A change purse contains two loonies, six quarters, seven dimes, four nickels, and five pennies.

Compare the loonies, quarters, and nickels by means of a ratio that is expressed in lowest terms.

change to values in cents

200 : 150 : 70 : 20 : 5
= 40 : 30 : 14 : 4 : 1

I Don't Know What Noso Mean I gotta unscramble it!its do tomorrow

To compare the loonies, quarters, and nickels by means of a ratio, we need to find the lowest common multiple (LCM) of their quantities.

The LCM of 2, 6, and 4 is 12.

Now let's express the quantities of loonies, quarters, and nickels in terms of this LCM:

2 loonies = (2/2) x 12 = 12
6 quarters = (6/6) x 12 = 12
4 nickels = (4/4) x 12 = 12

Therefore, the ratio of loonies, quarters, and nickels expressed in lowest terms is 12:12:12 (or 1:1:1).

To compare the loonies, quarters, and nickels, we need to calculate the ratio of the number of each coin.

First, let's calculate the lowest common multiple (LCM) of the numbers of loonies, quarters, and nickels. In this case, the LCM of 2, 6, and 4 is 12.

Next, let's determine the number of each coin in terms of the LCM (12).

- The number of loonies is 2, so the equivalent number of loonies in terms of LCM is (2/2) x 12 = 12.
- The number of quarters is 6, so the equivalent number of quarters in terms of LCM is (6/2) x 12 = 36.
- The number of nickels is 4, so the equivalent number of nickels in terms of LCM is (4/4) x 12 = 12.

Now, we can express the ratio in its lowest terms by finding the greatest common divisor (GCD) of the numbers of each coin: GCD(12, 36, 12).

The GCD of 12, 36, and 12 is 12.
So, the lowest terms ratio of loonies, quarters, and nickels is 12:36:12.

Dividing each term by 12 gives us the simplified ratio 1:3:1.

Therefore, the ratio in its lowest terms is 1:3:1, representing the number of loonies, quarters, and nickels, respectively, in the change purse.