Divide 186 marbles between DON and ANDRE so that DON gets twice as many as ANDRE.:(
A = Andre
A + 2A = 186
3A = 186
A = 186/3
A = ?
Andre gets 62 marbles and Don gets 124 marbles.
Let's divide the marbles step-by-step.
Step 1: Assign a variable to represent the number of marbles that Andre will get. Let's call it "x".
Step 2: According to the given condition, Don will get twice as many marbles as Andre. So, Don will get 2 times "x". This can be represented as 2x.
Step 3: The total number of marbles is 186. So, we can create an equation to represent this: x + 2x = 186.
Step 4: Simplify the equation: 3x = 186.
Step 5: Solve for x by dividing both sides of the equation by 3: x = 62.
Step 6: Substitute the value of x back into the equation to find the number of marbles each person gets: Andre = x = 62 marbles, Don = 2x = 2 * 62 = 124 marbles.
Therefore, Andre will get 62 marbles, and Don will get 124 marbles.
To divide 186 marbles between DON and ANDRE so that DON gets twice as many as ANDRE, we need to follow these steps:
Step 1: Let's assume the number of marbles ANDRE gets is x.
Step 2: According to the problem, DON gets twice as many marbles as ANDRE. So, DON gets 2x marbles.
Step 3: The total number of marbles is given as 186. Therefore, we can write the equation: x + 2x = 186.
Step 4: Simplify the equation: 3x = 186.
Step 5: Solve for x: x = 186/3 = 62.
Step 6: Now, we know that ANDRE gets 62 marbles, and DON gets twice as many, which is 2 * 62 = 124 marbles.
So, to divide 186 marbles between DON and ANDRE in the desired ratio, ANDRE will get 62 marbles, and DON will get 124 marbles.