∵ Quadratic expression is positive, hence 1+2m>0 and D<0
⇒m>2−1 and
4(1+3m)2−16(1+m)(1+2m)<0
⇒9m2+1+6m−4(2m2+3m+1)<0
⇒m2−6m−3<0
⇒(m−3+23)(m−3−23)<0
⇒m∈(3−23,3+23)
∴m=0,1,2,3,4,5,6
∴ Number of integral values =7
The number of integral values of m for which the quadratic expression (1+2m)x2−2(1+3m)x+4(1+m),x∈R is always positive, is
Held on 12 Jan 2019 · Verified 6 Jul 2026.
7
3
6
8
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