Since f(x)=sin(1+9x2×3x) Suppose 3x=tant ⇒f(x)=sin−1(1+tan2t2tant)=sin−1(sin2t)=2t=2tan−1(3x) So, f′(x)=1+(3x)22×3x⋅loge3∴f′(−21)=1+(3−21)22×3−21⋅loge3=21×3×loge3=3×loge3
If f(x)=sin−1(1+9x2×3x), then f′(−21) equals.
Held on 15 Apr 2018 · Verified 6 Jul 2026.
3loge3
−3loge3
−3loge3
3loge3
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