The correct option is D The equation f(x)=0 has only two roots in [0,π2]
f(x)=sin5x+cos5x−1
f′(x)=(5sinxcosx)(sin3x−cos3x)
∴f′(x)<0 for all x∈(0,π4)
and f′(x)>0 for x∈(π4,π2)
Since, f(0)=0=f(π2)
Applying Rolles theorem to f on (0,π2)
f′(c)=0 for at least one c in (0,π2)
Also, sin5x+cos5x≤sin2x+cos2x=1 for x∈[0,π2]
Equality holds only if sin5x=sin2x and cos5x=cos2x
⇒x=0,π2