Difference between revisions of "2007 AMC 10A Problems/Problem 10"

Revision as of 19:16, 24 October 2020

Problem

The Dunbar family consists of a mother, a father, and some children. The average age of the members of the family is $20$ , the father is $48$ years old, and the average age of the mother and children is $16$ . How many children are in the family?

$\text{(A)}\ 2 \qquad \text{(B)}\ 3 \qquad \text{(C)}\ 4 \qquad \text{(D)}\ 5 \qquad \text{(E)}\ 6$

Solution 1

Let $n$ be the number of children. Then the total ages of the family is $48 + 16(n+1)$ , and the total number of people in the family is $n+2$ . So

$20 = \frac{48 + 16(n+1)}{n+2} \Longrightarrow 20n + 40 = 16n + 64 \Longrightarrow n = 6\ \mathrm{(E)}.$

Solution 2

Let $x$ be the number of the children + the mom. The father, who is $48$ , plus the number of kids and mom divided by the number of kids and mom plus $1$ (for the dad) = $20$ . This is because the average age of the entire family is $20.$ Basically, this looks like: $\frac{48+16x}{x+1}=20$ $48+16x=20x+20$ $4x=28$ $x=7$

$7$ people - $1$ mom = $6$ children.

Therefore, the answer is $\boxed{E}$

Solution 3

Let $m$ be the Mom's age.

Let the number of children be $x$ and their average be $y$ . Their age totaled up is simply $xy$ .

We have the following two equations:

$\frac{m+48+xy}{2+x}=20$ , where $m+48+xy$ is the family's total age and $2+x$ (Mom + Dad + Children).

$\frac{m+48+xy}{2+x}=20$

$m+48+xy=40+40x$

The next equation is $\frac{m+xy}{1+x}=16$ , where $m+xy$ is the total ages of the Mom and the children, and $1+x$ is the number of people.

$\frac{m+xy}{1+x}=16$

$m+xy=16+16x$ .

We know the value for $m+xy$ , so we substitute the value back in the first equation.

$m+48+xy=40+40x$

$(16+16x)+48=40+40x$ .

$x=6$ .

Earlier, we set $x$ to be the number of children. Therefore, there are $\boxed{\text{(E)} 6}$ children.

@@ Line 11: / Line 11: @@
 == Solution 2 ==
-Let x be number of children+the mom. The father, who is 48, plus the number of kids and mom divided by the number of kids and mom plus 1 (for the dad)=20. This is because the average age of the entire family is 20.
+Let <math>x</math> be the number of the children + the mom. The father, who is <math>48</math>, plus the number of kids and mom divided by the number of kids and mom plus <math>1</math> (for the dad) = <math>20</math>. This is because the average age of the entire family is <math>20.</math>
-Basically, this looks like 48+16x/x+1=20
+Basically, this looks like: <cmath>\frac{48+16x}{x+1}=20</cmath>
-<math>48+16x=20x+20
+<cmath>48+16x=20x+20</cmath>
-x=28
+<cmath>4x=28</cmath>
-x=7</math>
+<cmath>x=7</cmath>
-people - 1 mom = 6 children.
+<math>7</math> people - <math>1</math> mom = <math>6</math> children.
-E is the answer
+Therefore, the answer is <math>\boxed{E}</math>
 ==Solution 3==

2007 AMC 10A (Problems • Answer Key • Resources)
Preceded by Problem 9	Followed by Problem 11
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