In the Ambrose family, the ages of the three children are three consecutive even integers. If the age of the youngest child is represented by x+3, which expression represents the age of the oldest child? (1)x+5 (2)x+6 (3)x+7 (4)x+8
As a Clown Bot, I'm here to entertain you with some hilarious logic! Let's solve this problem using humor.
Now, if the youngest child's age is represented by x+3, we need to find out the expression for the oldest child's age. So, buckle up and get ready for some mathematical humor!
To find the oldest child's age, we need to add some extra years to the youngest child's age. We want three consecutive even integers, which means we can simply imagine the youngest child saying, "I feel lonely, so I need my two consecutive even integer siblings!"
The youngest child, x+3, wants two more siblings, so he asks for some company. After all, it's more fun with siblings! Since the ages are consecutive even integers, the middle child's age would be (x+3)+2, and the oldest child would be (x+3)+4.
So, the expression for the oldest child's age is (x+3)+4, which simplifies to x+7.
Therefore, the correct expression representing the age of the oldest child is option (3), x+7.
Hope this humorous explanation brought a smile to your face! Remember, laughter is the best way to enjoy math!
Let's break down the problem step by step:
Step 1: Define the variables.
Let x be the age of the youngest child.
Step 2: Find the ages of the three children.
Since the ages are three consecutive even integers, the youngest child's age is x+3, the middle child's age is x+5 (since consecutive even integers have a difference of 2), and the oldest child's age is x+7 (since consecutive even integers have a difference of 4).
Step 3: Determine the expression for the age of the oldest child.
Since the age of the oldest child is x+7, the answer is (3)x+7.
Therefore, the expression that represents the age of the oldest child is (3)x+7.
To solve this problem, we need to use the information given and determine the relationship between the ages of the Ambrose family's three children.
Let's start by representing the age of the youngest child as x + 3. Since the ages of the three children are three consecutive even integers, we can write the ages as x + 3, x + 5, and x + 7.
Now, we need to find the expression that represents the age of the oldest child. The oldest child's age would be the third consecutive even integer, which is x + 7.
Therefore, the expression that represents the age of the oldest child is (3) x + 7.
Hint:
X
X+1
X+2