A snack bar sells two sizes of snack packs. A large snack pack is $5, and a small snack pack is $3. In one day, the snack bar sold 60 snack packs for a total of $220.

Part A:

Let x = small snack packs
Let y = large snack packs

The price of a small snack pack is $3, so the revenue from selling small snack packs can be represented as:
3x

The price of a large snack pack is $5, so the revenue from selling large snack packs can be represented as:
5y

The snack bar sold a total of 60 snack packs, so the total number of snack packs sold can be represented as:
x + y = 60

The snack bar made a total of $220, so the total revenue can be represented as:
3x + 5y = 220

Therefore, the system of equations that represents the scenario above is:
x + y = 60
3x + 5y = 220

Part B:

To solve the system of equations using the Elimination Method, we can eliminate one variable by multiplying one equation by a certain number and subtracting it from the other equation. In this case, let's eliminate x by multiplying the first equation by 3:

3(x + y) = 3(60)
3x + 3y = 180

Now we subtract the second equation (3x + 5y = 220) from the multiplied first equation:

(3x + 3y) - (3x + 5y) = 180 - 220
3x + 3y - 3x - 5y = -40
-2y = -40

Dividing both sides by -2, we get:

y = (-40) / (-2)
y = 20

Therefore, the snack bar sold 20 large snack packs.