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Example. Let f(x)=(x^(2)+1) and g(x)=(x^(3)-3x) . Compute: (d)/(dx)f(x)g(x) Explanation. Write with me (d)/(dx)f(x)g(x)=f(x)g^(')(x)+f^(')(x)g(x) =(x^(2)+1) We could stop here, but we should show that
Example. Let
f(x)=(x^(2)+1) and
g(x)=(x^(3)-3x). Compute:\
(d)/(dx)f(x)g(x)\ Explanation. Write with me\
(d)/(dx)f(x)g(x)=f(x)g^(')(x)+f^(')(x)g(x)\ =(x^(2)+1)\ We could stop here, but we should show that expanding this out recovers our previous result. Write\
(x^(2)+1)(3x^(2)-3)+2x(x^(3)-3x)\ =3x^(4)-3x^(2)+3x^(2)-3+2x^(4)-6x^(2)\ which is precisely what we obtained before.
Example. Let f(x)=(x2+1) and g(x)=(x33x). Compute: dxdf(x)g(x) Explanation. Write with me dxdf(x)g(x)=f(x)g(x)+f(x)g(x)=(x2+1)()+()(x33x). We could stop here, but we should show that expanding this out recovers our previous result. Write (x2+1)(3x23)+2x(x33x)=3x43x2+3x23+2x46x2 which is precisely what we obtained before. Example. Let f(x)=(x2+1) and g(x)=(x33x). Compute: dxdf(x)g(x) Explanation. Write with me dxdf(x)g(x)=f(x)g(x)+f(x)g(x)=(x2+1)()+()(x33x). We could stop here, but we should show that expanding this out recovers our previous result. Write (x2+1)(3x23)+2x(x33x)=3x43x2+3x23+2x46x2 which is precisely what we obtained before
Example. Let
f(x)=(x^(2)+1)and
g(x)=(x^(3)-3x). Compute:\
(d)/(dx)f(x)g(x)\ Explanation. Write with me\
(d)/(dx)f(x)g(x)=f(x)g^(')(x)+f^(')(x)g(x)\ =(x^(2)+1)\ We could stop here, but we should show that expanding this out recovers our previous result. Write\
(x^(2)+1)(3x^(2)-3)+2x(x^(3)-3x)\ =3x^(4)-3x^(2)+3x^(2)-3+2x^(4)-6x^(2)\ which is precisely what we obtained before.
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