The correct option is C 2a+3b−4c=0
√−x2+10x−16<x−2 is meaningful when
−x2+10x−16≥0
⇒x2−10x+16≤0⇒(x−2)(x−8)≤0⇒x∈[2,8] ⋯(1)
Now, √−x2+10x−16<x−2
⇒−x2+10x−16<(x−2)2⇒2x2−14x+20>0⇒x2−7x+10>0
⇒(x−2)(x−5)>0
⇒x∈(−∞,2)∪(5,∞) ⋯(2)
From (1) and (2),
x∈(5,8]
∴a=6,b=7,c=8
The minimum value of |x−6|+|x−7|+|x−8| occurs at x=median{6,7,8}
i.e., the minimum value of |x−6|+|x−7|+|x−8| occurs at x=7 and the minimum value is 2.
The quadratic equation whose roots are a and b is,
x2−(a+b)+ab=0⇒x2−13x+42=0
Also, 2a+3b−4c=12+21−32=1
and 2b=14=a+c