f′(x)=18x2−90ax+108a2=0x=2a&x=3ax1=2ax2=3ax1x2=546a2=54a=3a+x1+x23+2×3+3×3=18 option (2)
Let a>0. If the function f(x)=6x3−45ax2+108a2x+1 attains its local maximum and minimum values at the points x1 and x2 respectively such that x1x2=54, then a+x1+x2 is equal to :-
Held on 4 Apr 2025 · Verified 6 Jul 2026.
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