Answer : Remaining two observation becomes 97 and 107.
Explanation :
Since we have given that
Mean = 100
Modal value = 98
Range = 10
As we know that ,
Range = Highest-Lowest
Let highest observation be x
Let lowest observation be y
So equation becomes x-y=10 ----equation 1
So, observation becomes
x,98,98,y
Now, we use the formula of mean i.e.
Mean = [tex]\frac{\text{Sum of observation}}{\text{N.of observaton}}[/tex]
So, mean =[tex]\frac{x=98=98+y}{4}=400\\\frac{196+x+y}{4}=100\\x+y=400-196\\x-y=204[/tex]
So our 2nd equation becomes
x+y=204
On using elimination method of system of linear equation on these two equation we get,
x=97
and
[tex]x+y=204\\y=204-x\\y=204-97\\y=107[/tex]
Hence , remaining two observation becomes 97 and 107.
