f(x) is a cubic polynomial function such that f(x)=0 at x=1,2,3 and passing through the point (0,−6). Then the area bounded by the curve f(x) and the x− axis between x=0 and x=3 is
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Solution
f(x)=0 at x=1,2,3 ⇒f(x)=a(x−1)(x−2)(x−3) Since, f(x) is passing through the point (0,−6) ⇒f(0)=−6 ⇒a(0−1)(0−2)(0−3)=−6 ⇒a=1 ⇒f(x)=(x−1)(x−2)(x−3)
The graph of the given function for 0≤x≤3 is as shown in figure.
Hence, the required area A= shaded area =∣∣
∣∣1∫0ydx∣∣
∣∣+∣∣
∣∣2∫1ydx∣∣
∣∣+∣∣
∣∣3∫2ydx∣∣
∣∣...(1) Since, ∫ydx=∫(x−1)(x−2)(x−3)dx =∫(x3−6x2+11x−6)dx =x44−2x3+11x22−6x ∴ From (1) A=∣∣
∣∣[x44−2x3+11x22−6x]10∣∣
∣∣+∣∣
∣∣[x44−2x3+11x22−6x]21∣∣
∣∣+∣∣
∣∣[x44−2x3+11x22−6x]32∣∣
∣∣ =∣∣∣−94∣∣∣+(14)+∣∣∣−14∣∣∣ =114sq. units