How can 4 red marbles make up to 1/3 of a group
explain how four red marbles can make up 1/3 of a group of marbles and three blue marbles make up 1/4 of the same group?
It looks like you have 12 marbles.
1/3 of 12 = 4
1/4 of 12 = ?
To determine how 4 red marbles can make up to 1/3 of a group, we need to consider the total number of marbles in the group.
Step 1: Let's represent the total number of marbles in the group as "x."
Step 2: Since 4 marbles are equivalent to 1/3 of the group, we can set up the equation 4 = (1/3)x.
Step 3: To solve for "x," we need to isolate it on one side of the equation. Multiply both sides of the equation by 3: 3 * 4 = x.
Step 4: Simplify the equation: 12 = x.
Therefore, if there are 12 marbles in total, 4 red marbles will make up to 1/3 of the group.
To determine how four red marbles can make up to 1/3 of a group, we need to understand the total number of marbles in the group.
Let's assume that the group consists of x marbles in total. If four red marbles make up 1/3 of the group, it means that the number of red marbles is equal to 1/3 of x.
To find the total number of marbles in the group, we'll use the following equation:
4 = (1/3) * x
To solve for x, we can multiply both sides of the equation by 3:
4 * 3 = 1 * x
12 = x
Therefore, there are 12 marbles in total in the group. And four red marbles make up 1/3 of this group.