Answer:
[tex]x,y=7,8[/tex]
Step-by-step explanation:
4 6 x y 10
As x is the median number of this sequence, we know that the mean would be equal to this.
The mean is defined as:
[tex]\frac{4+6+x+y+10}{5}=\frac{20+x+y}{5}[/tex]
So we can say that:
[tex]\frac{20+x+y}{5}=x[/tex]
Rearranging this, we get:
[tex]\frac{20+x+y}{5}=x\\20+x+y=5x\\20+y=4x[/tex]
As we know that:
[tex]x, y \in \mathbb{R}\\y\geq x\\x,y \in \{6 \leq x,y \leq10 \}[/tex]
So we can substitute in values and see which fit the equality:
Subbing in x as 6 gives us,
[tex]4(6)=20+y\\24=20+y\\y=4[/tex]
However, y must be bigger than x and must be between 6 and 10, so this is incorrect.
Subbing in x as 7 gives us,
[tex]4(7)=20+y\\28=20+y\\8=y[/tex]
As 8 is bigger than 7, and is in between 6 and 10, this means all of our inequalities have been met and we have the correct answer.
