Respuesta :

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[tex]\dfrac{x+(x+1)+(x+2)+(x+3)}4=\dfrac{4x+6}4=15\implies 4x+6=60\implies 4x=54\implies x=9[/tex]

which means [tex]a_1=x=9[/tex] and [tex]a_2=x+3=12[/tex]

Answer: The greatest no a1 is 18 and smallest no a2 is 12

Step-by-step explanation:

Let the consecutive even numbers be

x, x+2 , x+4 , x+6

Given mean of four nos =15

Now mean = Sum of all observations/No of observations

15 = [tex]\frac{x+x+2 + x+4 +x + 6}{4}[/tex]

4x +12 =15×4

4x + 12 = 60

Subtracting 12 both sides

4x + 12- 12 =60 - 12

4x = 48

Dividing both sides by 4

x=12

Hence the smallest no i.e. a2 is 12

Other nos be 12 +2 =14, 12+4 =16, 12 +6= 18

The greatest no i.e. a1 = 18

Hence the nos are 12, 14, 16, 18

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