We have f(x)=x3−3x2+5x+7
f′(x)=3x2−6x+5>0
D=b2−4ac=36−4⋅3⋅5=−14(−ve)
Then, f′(x)>0.
Hence, f(x) is increasing in R.
The function f defined by f(x)=x3−3x2+5x+7 is:
Held on 9 Apr 2017 · Verified 6 Jul 2026.
Decreasing in R
Increasing in R
Increasing in (0,∞) and decreasing in (−∞,0)
Decreasing in (0,∞) and increasing in (−∞,0)
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