\documentclass{article} \usepackage{axiom} \begin{document} \title{\$SPAD/input schaum1.input} \author{Timothy Daly} \maketitle \eject \tableofcontents \eject \section{\cite{1}:14.59~~~~~$\displaystyle \int{\frac{dx}{ax+b}}$} $$\int{\frac{1}{ax+b}}= \frac{1}{a}~\ln(ax+b) $$ <<*>>= )spool schaum1.output )set message test on )set message auto off )clear all --S 1 aa:=integrate(1/(a*x+b),x) --R --R log(a x + b) --R (1) ------------ --R a --R Type: Union(Expression Integer,...) --E 1 --S 2 bb:=1/a*log(a*x+b) --R --R log(a x + b) --R (2) ------------ --R a --R Type: Expression Integer --E --S 3 14:59 Schaums and Axiom agree cc:=bb-aa --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.60~~~~~$\displaystyle \int{\frac{x~dx}{ax+b}}$} $$\int{\frac{x}{ax+b}}= \frac{x}{a}-\frac{b}{a^2}~\ln(ax+b) $$ <<*>>= )clear all --S 4 aa:=integrate(x/(a*x+b),x) --R --R --R - b log(a x + b) + a x --R (1) ---------------------- --R 2 --R a --R Type: Union(Expression Integer,...) --E --S 5 bb:=x/a-b/a^2*log(a*x+b) --R --R - b log(a x + b) + a x --R (2) ---------------------- --R 2 --R a --R Type: Expression Integer --E --S 6 14:60 Schaums and Axiom agree cc:=bb-aa --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.61~~~~~$\displaystyle \int{\frac{x^2~dx}{ax+b}}$} $$\int{\frac{x^2}{ax+b}}= \frac{(ax+b)^2}{2a^3}-\frac{2b(ax+b)}{a^3}+\frac{b^2}{a^3}~\ln(ax+b) $$ <<*>>= )clear all --S 7 aa:=integrate(x^2/(a*x+b),x) --R --R 2 2 2 --R 2b log(a x + b) + a x - 2a b x --R (1) ------------------------------- --R 3 --R 2a --R Type: Union(Expression Integer,...) --E --S 8 bb:=(a*x+b)^2/(2*a^3)-(2*b*(a*x+b))/a^3+b^2/a^3*log(a*x+b) --R --R 2 2 2 2 --R 2b log(a x + b) + a x - 2a b x - 3b --R (2) ------------------------------------- --R 3 --R 2a --R Type: Expression Integer --E --S 9 cc:=bb-aa --R --R 2 --R 3b --R (3) - --- --R 3 --R 2a --R Type: Expression Integer --E @ This factor is constant with respect to $x$ as shown by taking the derivative. It is a constant of integration. <<*>>= --S 10 14:61 Schaums and Axiom differ by a constant differentiate(cc,x) --R --R (4) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.62~~~~~$\displaystyle \int{\frac{x^3~dx}{ax+b}}$} $$\int{\frac{x^3}{ax+b}}= \frac{(ax+b)^3}{3a^4}-\frac{3b(ax+b)^2}{2a^4}+ \frac{3b^2(ax+b)}{a^4}-\frac{b^3}{a^4}~\ln(ax+b) $$ <<*>>= )clear all --S 11 aa:=integrate(x^3/(a*x+b),x) --R --R 3 3 3 2 2 2 --R - 6b log(a x + b) + 2a x - 3a b x + 6a b x --R (1) -------------------------------------------- --R 4 --R 6a --R Type: Union(Expression Integer,...) --E @ and the book expression is: <<*>>= --S 12 bb:=(a*x+b)^3/(3*a^4)-(3*b*(a*x+b)^2)/(2*a^4)+(3*b^2*(a*x+b))/a^4-(b^3/a^4)*log(a*x+b) --R --R 3 3 3 2 2 2 3 --R - 6b log(a x + b) + 2a x - 3a b x + 6a b x + 11b --R (2) --------------------------------------------------- --R 4 --R 6a --R Type: Expression Integer --E @ The difference is a constant with respect to x: <<*>>= --S 13 cc:=aa-bb --R --R 3 --R 11b --R (3) - ---- --R 4 --R 6a --R Type: Expression Integer --E @ If we differentiate each expression we see that this is the integration constant. <<*>>= --S 14 14:62 Schaums and Axiom differ by a constant dd:=D(cc,x) --R --R (4) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.63~~~~~$\displaystyle \int{\frac{dx}{x~(ax+b)}}$} $$\int{\frac{1}{x~(ax+b)}}= \frac{1}{b}~\ln\left(\frac{x}{ax+b}\right) $$ <<*>>= )clear all --S 15 aa:=integrate(1/(x*(a*x+b)),x) --R --R - log(a x + b) + log(x) --R (1) ----------------------- --R b --R Type: Union(Expression Integer,...) --E --S 16 bb:=1/b*log(x/(a*x+b)) --R --R x --R log(-------) --R a x + b --R (2) ------------ --R b --R Type: Expression Integer --E --S 17 cc:=aa-bb --R --R x --R - log(a x + b) + log(x) - log(-------) --R a x + b --R (3) -------------------------------------- --R b --R Type: Expression Integer --E @ but we know that $$\log(a)-\log(b)=\log(\frac{a}{b})$$ We can express this fact as a rule: <<*>>= --S 18 logdiv:=rule(log(a)-log(b) == log(a/b)) --R --R a --I (4) - log(b) + log(a) + %I == log(-) + %I --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E @ and use this rule to rewrite the logs into divisions: <<*>>= --S 19 14:63 Schaums and Axiom agree dd:=logdiv cc --R --R (5) 0 --R Type: Expression Integer --E @ so we can see the equivalence directly. \section{\cite{1}:14.64~~~~~$\displaystyle \int{\frac{dx}{x^2~(ax+b)}}$} $$\int{\frac{1}{x^2~(ax+b)}}= -\frac{1}{bx}+\frac{a}{b^2}~\ln\left(\frac{ax+b}{x}\right) $$ <<*>>= )clear all --S 20 aa:=integrate(1/(x^2*(a*x+b)),x) --R --R a x log(a x + b) - a x log(x) - b --R (1) --------------------------------- --R 2 --R b x --R Type: Union(Expression Integer,...) --E @ The original form given in the book expands to: <<*>>= --S 21 bb:=-1/(b*x)+a/b^2*log((a*x+b)/x) --R --R a x + b --R a x log(-------) - b --R x --R (2) -------------------- --R 2 --R b x --R Type: Expression Integer --E --S 22 cc:=aa-bb --R --R a x + b --R a log(a x + b) - a log(x) - a log(-------) --R x --R (3) ------------------------------------------ --R 2 --R b --R Type: Expression Integer --E @ We can define the following rule to expand log forms: <<*>>= --S 23 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E @ and apply it to the difference <<*>>= --S 24 14:64 Schaums and Axiom agree divlog cc --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.65~~~~~$\displaystyle \int{\frac{dx}{x^3~(ax+b)}}$} $$\int{\frac{1}{x^3~(ax+b)}}= \frac{2ax-b}{2b^2x^2}+\frac{a^2}{b^3}~\ln\left(\frac{x}{ax+b}\right) $$ <<*>>= )clear all --S 25 aa:=integrate(1/(x^3*(a*x+b)),x) --R --R 2 2 2 2 2 --R - 2a x log(a x + b) + 2a x log(x) + 2a b x - b --R (1) ----------------------------------------------- --R 3 2 --R 2b x --R Type: Union(Expression Integer,...) --E --S 26 bb:=(2*a*x-b)/(2*b^2*x^2)+a^2/b^3*log(x/(a*x+b)) --R --R 2 2 x 2 --R 2a x log(-------) + 2a b x - b --R a x + b --R (2) ------------------------------- --R 3 2 --R 2b x --R Type: Expression Integer --E --S 27 cc:=aa-bb --R --R 2 2 2 x --R - a log(a x + b) + a log(x) - a log(-------) --R a x + b --R (3) -------------------------------------------- --R 3 --R b --R Type: Expression Integer --E --S 28 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 29 14:65 Schaums and Axiom agree dd:=divlog cc --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.66~~~~~$\displaystyle \int{\frac{dx}{(ax+b)^2}}$} $$\int{\frac{1}{(ax+b)^2}}= \frac{-1}{a~(ax+b)} $$ <<*>>= )clear all --S 30 aa:=integrate(1/(a*x+b)^2,x) --R --R 1 --R (1) - --------- --R 2 --R a x + a b --R Type: Union(Expression Integer,...) --E --S 31 bb:=-1/(a*(a*x+b)) --R --R 1 --R (2) - --------- --R 2 --R a x + a b --R Type: Fraction Polynomial Integer --E --S 32 14:66 Schaums and Axiom agree cc:=aa-bb --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.67~~~~~$\displaystyle \int{\frac{x~dx}{(ax+b)^2}}$} $$\int{\frac{x}{(ax+b)^2}}= \frac{b}{a^2~(ax+b)}+\frac{1}{a^2}~\ln(ax+b) $$ <<*>>= )clear all --S 33 aa:=integrate(x/(a*x+b)^2,x) --R --R (a x + b)log(a x + b) + b --R (1) ------------------------- --R 3 2 --R a x + a b --R Type: Union(Expression Integer,...) --E --S 34 bb:=b/(a^2*(a*x+b))+1/a^2*log(a*x+b) --R --R (a x + b)log(a x + b) + b --R (2) ------------------------- --R 3 2 --R a x + a b --R Type: Expression Integer --E --S 35 14:67 Schaums and Axiom agree cc:=aa-bb --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.68~~~~~$\displaystyle \int{\frac{x^2~dx}{(ax+b)^2}}$} $$\int{\frac{x^2}{(ax+b)^2}}= \frac{ax+b}{a^3}-\frac{b^2}{a^3~(ax+b)} -\frac{2b}{a^3}~\ln(ax+b) $$ <<*>>= )clear all --S 36 aa:=integrate(x^2/(a*x+b)^2,x) --R --R 2 2 2 2 --R (- 2a b x - 2b )log(a x + b) + a x + a b x - b --R (1) ------------------------------------------------ --R 4 3 --R a x + a b --R Type: Union(Expression Integer,...) --E @ and the book expression expands into <<*>>= --S 37 bb:=(a*x+b)/a^3-b^2/(a^3*(a*x+b))-((2*b)/a^3)*log(a*x+b) --R --R 2 2 2 --R (- 2a b x - 2b )log(a x + b) + a x + 2a b x --R (2) -------------------------------------------- --R 4 3 --R a x + a b --R Type: Expression Integer --E @ These two expressions differ by the constant <<*>>= --S 38 cc:=aa-bb --R --R b --R (3) - -- --R 3 --R a --R Type: Expression Integer --E @ That this expression is constant can be shown by differentiation: <<*>>= --S 39 14:68 Schaums and Axiom differ by a constant D(cc,x) --R --R (4) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.69~~~~~$\displaystyle \int{\frac{x^3~dx}{(ax+b)^2}}$} $$\int{\frac{x^3}{(ax+b)^2}}= \frac{(ax+b)^2}{2a^4}-\frac{3b(ax+b)}{a^4}+\frac{b^3}{a^4(ax+b)} +\frac{3b^2}{a^4}~\ln(ax+b) $$ <<*>>= )clear all --S 40 aa:=integrate(x^3/(a*x+b)^2,x) --R --R 2 3 3 3 2 2 2 3 --R (6a b x + 6b )log(a x + b) + a x - 3a b x - 4a b x + 2b --R (1) ---------------------------------------------------------- --R 5 4 --R 2a x + 2a b --R Type: Union(Expression Integer,...) --E --S 41 bb:=(a*x+b)^2/(2*a^4)-(3*b*(a*x+b))/a^4+b^3/(a^4*(a*x+b))+(3*b^2/a^4)*log(a*x+b) --R --R 2 3 3 3 2 2 2 3 --R (6a b x + 6b )log(a x + b) + a x - 3a b x - 9a b x - 3b --R (2) ---------------------------------------------------------- --R 5 4 --R 2a x + 2a b --R Type: Expression Integer --E --S 42 cc:=aa-bb --R --R 2 --R 5b --R (3) --- --R 4 --R 2a --R Type: Expression Integer --E --S 43 14:69 Schaums and Axiom differ by a constant dd:=D(cc,x) --R --R (4) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.70~~~~~$\displaystyle \int{\frac{dx}{x~(ax+b)^2}}$} $$\int{\frac{1}{x~(ax+b)^2}}= \frac{1}{b~(ax+b)}+\frac{1}{b^2}~\ln\left(\frac{x}{ax+b}\right) $$ <<*>>= )clear all --S 44 aa:=integrate(1/(x*(a*x+b)^2),x) --R --R (- a x - b)log(a x + b) + (a x + b)log(x) + b --R (1) --------------------------------------------- --R 2 3 --R a b x + b --R Type: Union(Expression Integer,...) --E @ and the book says: <<*>>= --S 45 bb:=(1/(b*(a*x+b))+(1/b^2)*log(x/(a*x+b))) --R --R x --R (a x + b)log(-------) + b --R a x + b --R (2) ------------------------- --R 2 3 --R a b x + b --R Type: Expression Integer --E --S 46 cc:=aa-bb --R --R x --R - log(a x + b) + log(x) - log(-------) --R a x + b --R (3) -------------------------------------- --R 2 --R b --R Type: Expression Integer --E @ So we look at the divlog rule again: <<*>>= --S 47 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E @ we apply it: <<*>>= --S 48 14:70 Schaums and Axiom agree dd:=divlog cc --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.71~~~~~$\displaystyle \int{\frac{dx}{x^2~(ax+b)^2}}$} $$\int{\frac{1}{x^2~(ax+b)^2}}= \frac{-a}{b^2~(ax+b)}-\frac{1}{b^2~x}+ \frac{2a}{b^3}~\ln\left(\frac{ax+b}{x}\right) $$ <<*>>= )clear all --S 49 aa:=integrate(1/(x^2*(a*x+b)^2),x) --R --R 2 2 2 2 2 --R (2a x + 2a b x)log(a x + b) + (- 2a x - 2a b x)log(x) - 2a b x - b --R (1) --------------------------------------------------------------------- --R 3 2 4 --R a b x + b x --R Type: Union(Expression Integer,...) --E @ and the book says: <<*>>= --S 50 bb:=(-a/(b^2*(a*x+b)))-(1/(b^2*x))+((2*a)/b^3)*log((a*x+b)/x) --R --R 2 2 a x + b 2 --R (2a x + 2a b x)log(-------) - 2a b x - b --R x --R (2) ------------------------------------------ --R 3 2 4 --R a b x + b x --R Type: Expression Integer --E --S 51 cc:=aa-bb --R --R a x + b --R 2a log(a x + b) - 2a log(x) - 2a log(-------) --R x --R (3) --------------------------------------------- --R 3 --R b --R Type: Expression Integer --E @ which calls for our divlog rule: <<*>>= --S 52 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E @ which we use to transform the result: <<*>>= --S 53 14:71 Schaums and Axiom agree dd:=divlog cc --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.72~~~~~$\displaystyle \int{\frac{dx}{x^3~(ax+b)^2}}$} $$\int{\frac{1}{x^3~(ax+b)^2}}= -\frac{(ax+b)^2}{2b^4x^2}+\frac{3a(ax+b)}{b^4x}- \frac{a^3x}{b^4(ax+b)}-\frac{3a^2}{b^4}~\ln\left(\frac{ax+b}{x}\right) $$ <<*>>= )clear all --S 54 aa:=integrate(1/(x^3*(a*x+b)^2),x) --R --R (1) --R 3 3 2 2 3 3 2 2 2 2 --R (- 6a x - 6a b x )log(a x + b) + (6a x + 6a b x )log(x) + 6a b x --R + --R 2 3 --R 3a b x - b --R / --R 4 3 5 2 --R 2a b x + 2b x --R Type: Union(Expression Integer,...) --E --S 55 bb:=-(a*x+b)^2/(2*b^4*x^2)+(3*a*(a*x+b))/(b^4*x)-(a^3*x)/(b^4*(a*x+b))-((3*a^2)/b^4)*log((a*x+b)/x) --R --R 3 3 2 2 a x + b 3 3 2 2 2 3 --R (- 6a x - 6a b x )log(-------) + 3a x + 9a b x + 3a b x - b --R x --R (2) --------------------------------------------------------------- --R 4 3 5 2 --R 2a b x + 2b x --R Type: Expression Integer --E --S 56 cc:=aa-bb --R --R 2 2 2 a x + b 2 --R - 6a log(a x + b) + 6a log(x) + 6a log(-------) - 3a --R x --R (3) ----------------------------------------------------- --R 4 --R 2b --R Type: Expression Integer --E --S 57 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 58 dd:=divlog cc --R --R 2 --R 3a --R (5) - --- --R 4 --R 2b --R Type: Expression Integer --E --S 59 14:72 Schaums and Axiom differ by a constant ee:=D(dd,x) --R --R (6) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.73~~~~~$\displaystyle \int{\frac{dx}{(ax+b)^3}}$} $$\int{\frac{1}{(ax+b)^3}}= \frac{-1}{2a(ax+b)^2} $$ <<*>>= )clear all --S 60 aa:=integrate(1/(a*x+b)^3,x) --R --R 1 --R (1) - ---------------------- --R 3 2 2 2 --R 2a x + 4a b x + 2a b --R Type: Union(Expression Integer,...) --E --S 61 bb:=-1/(2*(a*x+b)^2) --R --R 1 --R (2) - -------------------- --R 2 2 2 --R 2a x + 4a b x + 2b --R Type: Fraction Polynomial Integer --E --S 62 cc:=aa-bb --R --R a - 1 --R (3) ---------------------- --R 3 2 2 2 --R 2a x + 4a b x + 2a b --R Type: Expression Integer --E --S 63 dd:=aa/bb --R --R 1 --R (4) - --R a --R Type: Expression Integer --E --S 64 14:73 Schaums and Axiom differ by a constant ee:=D(dd,x) --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.74~~~~~$\displaystyle \int{\frac{x~dx}{(ax+b)^3}}$} $$\int{\frac{x}{(ax+b)^3}}= \frac{-1}{a^2(ax+b)}+\frac{b}{2a^2(ax+b)^2} $$ <<*>>= )clear all --S 65 aa:=integrate(x/(a*x+b)^3,x) --R --R - 2a x - b --R (1) ---------------------- --R 4 2 3 2 2 --R 2a x + 4a b x + 2a b --R Type: Union(Expression Integer,...) --E --S 66 bb:=-1/(a^2*(a*x+b))+b/(2*a^2*(a*x+b)^2) --R --R - 2a x - b --R (2) ---------------------- --R 4 2 3 2 2 --R 2a x + 4a b x + 2a b --R Type: Fraction Polynomial Integer --E --S 67 14:74 Schaums and Axiom agree cc:=aa-bb --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.75~~~~~$\displaystyle \int{\frac{x^2~dx}{(ax+b)^3}}$} $$\int{\frac{x^2}{(ax+b)^3}}= \frac{2b}{a^3(ax+b)}-\frac{b^2}{2a^3(ax+b)^2}+ \frac{1}{a^3}~\ln(ax+b) $$ <<*>>= )clear all --S 68 aa:=integrate(x^2/(a*x+b)^3,x) --R --R 2 2 2 2 --R (2a x + 4a b x + 2b )log(a x + b) + 4a b x + 3b --R (1) ------------------------------------------------- --R 5 2 4 3 2 --R 2a x + 4a b x + 2a b --R Type: Union(Expression Integer,...) --E --S 69 bb:=(2*b)/(a^3*(a*x+b))-(b^2)/(2*a^3*(a*x+b)^2)+1/a^3*log(a*x+b) --R --R 2 2 2 2 --R (2a x + 4a b x + 2b )log(a x + b) + 4a b x + 3b --R (2) ------------------------------------------------- --R 5 2 4 3 2 --R 2a x + 4a b x + 2a b --R Type: Expression Integer --E --S 70 14:75 Schaums and Axiom agree cc:=aa-bb --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.76~~~~~$\displaystyle \int{\frac{x^3~dx}{(ax+b)^3}}$} $$\int{\frac{x^3}{(ax+b)^3}}= \frac{x}{a^3}-\frac{3b^2}{a^4(ax+b)}+\frac{b^3}{2a^4(ax+b)^2}- \frac{3b}{a^4}~\ln(ax+b) $$ <<*>>= )clear all --S 71 aa:=integrate(x^3/(a*x+b)^3,x) --R --R (1) --R 2 2 2 3 3 3 2 2 2 3 --R (- 6a b x - 12a b x - 6b )log(a x + b) + 2a x + 4a b x - 4a b x - 5b --R ------------------------------------------------------------------------ --R 6 2 5 4 2 --R 2a x + 4a b x + 2a b --R Type: Union(Expression Integer,...) --E --S 72 bb:=(x/a^3)-(3*b^2)/(a^4*(a*x+b))+b^3/(2*a^4*(a*x+b)^2)-(3*b)/a^4*log(a*x+b) --R --R (2) --R 2 2 2 3 3 3 2 2 2 3 --R (- 6a b x - 12a b x - 6b )log(a x + b) + 2a x + 4a b x - 4a b x - 5b --R ------------------------------------------------------------------------ --R 6 2 5 4 2 --R 2a x + 4a b x + 2a b --R Type: Expression Integer --E --S 73 14:76 Schaums and Axiom agree cc:=aa-bb --R --R (3) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.77~~~~~$\displaystyle \int{\frac{dx}{x(ax+b)^3}}$} $$\int{\frac{1}{x(ax+b)^3}}= \frac{3}{2b(ax+b)^2}+\frac{2ax}{2b^2(ax+b)^2}- \frac{1}{b^3}*\ln\left(\frac{ax+b}{x}\right) $$ <<*>>= )clear all --S 74 aa:=integrate(1/(x*(a*x+b)^3),x) --R --R (1) --R 2 2 2 2 2 2 --R (- 2a x - 4a b x - 2b )log(a x + b) + (2a x + 4a b x + 2b )log(x) --R + --R 2 --R 2a b x + 3b --R / --R 2 3 2 4 5 --R 2a b x + 4a b x + 2b --R Type: Union(Expression Integer,...) --E --S 75 bb:=(a^2*x^2)/(2*b^3*(a*x+b)^2)-(2*a*x)/(b^3*(a*x+b))-(1/b^3)*log((a*x+b)/x) --R --R 2 2 2 a x + b 2 2 --R (- 2a x - 4a b x - 2b )log(-------) - 3a x - 4a b x --R x --R (2) ----------------------------------------------------- --R 2 3 2 4 5 --R 2a b x + 4a b x + 2b --R Type: Expression Integer --E --S 76 cc:=aa-bb --R --R a x + b --R - 2log(a x + b) + 2log(x) + 2log(-------) + 3 --R x --R (3) --------------------------------------------- --R 3 --R 2b --R Type: Expression Integer --E --S 77 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 78 dd:=divlog cc --R --R 3 --R (5) --- --R 3 --R 2b --R Type: Expression Integer --E --S 79 14:77 Schaums and Axiom differ by a constant ee:=D(dd,x) --R --R (6) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.78~~~~~$\displaystyle \int{\frac{dx}{x^2(ax+b)^3}}$} $$\int{\frac{1}{x^2(ax+b)^3}}= \frac{-a}{2b^2(ax+b)^2}-\frac{2a}{b^3(ax+b)}- \frac{1}{b^3x}+\frac{3a}{b^4}~\ln\left(\frac{ax+b}{x}\right) $$ <<*>>= )clear all --S 80 aa:=integrate(1/(x^2*(a*x+b)^3),x) --R --R (1) --R 3 3 2 2 2 --R (6a x + 12a b x + 6a b x)log(a x + b) --R + --R 3 3 2 2 2 2 2 2 3 --R (- 6a x - 12a b x - 6a b x)log(x) - 6a b x - 9a b x - 2b --R / --R 2 4 3 5 2 6 --R 2a b x + 4a b x + 2b x --R Type: Union(Expression Integer,...) --E --S 81 bb:=-a/(2*b^2*(a*x+b)^2)-(2*a)/(b^3*(a*x+b))-1/(b^3*x)+((3*a)/b^4)*log((a*x+b)/x) --R --R 3 3 2 2 2 a x + b 2 2 2 3 --R (6a x + 12a b x + 6a b x)log(-------) - 6a b x - 9a b x - 2b --R x --R (2) ---------------------------------------------------------------- --R 2 4 3 5 2 6 --R 2a b x + 4a b x + 2b x --R Type: Expression Integer --E --S 82 cc:=aa-bb --R --R a x + b --R 3a log(a x + b) - 3a log(x) - 3a log(-------) --R x --R (3) --------------------------------------------- --R 4 --R b --R Type: Expression Integer --E --S 83 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 84 14:78 Schaums and Axiom agree dd:=divlog cc --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.79~~~~~$\displaystyle \int{\frac{dx}{x^3(ax+b)^3}}$} $$\int{\frac{1}{x^3(ax+b)^3}}= -\frac{1}{2bx^2(ax+b)^2}+ \frac{2a}{b^2x(ax+b)^2}+ \frac{9a^2}{b^3(ax+b)^2}+ \frac{6a^3x}{b^4(ax+b)^2}- \frac{6a^2}{b^5}~\ln\left(\frac{ax+b}{x}\right)$$ <<*>>= )clear all --S 85 aa:=integrate(1/(x^3*(a*x+b)^3),x) --R --R (1) --R 4 4 3 3 2 2 2 --R (- 12a x - 24a b x - 12a b x )log(a x + b) --R + --R 4 4 3 3 2 2 2 3 3 2 2 2 3 4 --R (12a x + 24a b x + 12a b x )log(x) + 12a b x + 18a b x + 4a b x - b --R / --R 2 5 4 6 3 7 2 --R 2a b x + 4a b x + 2b x --R Type: Union(Expression Integer,...) --E --S 86 bb:=-1/(2*b*x^2*(a*x+b)^2)_ +(2*a)/(b^2*x*(a*x+b)^2)_ +(9*a^2)/(b^3*(a*x+b)^2)_ +(6*a^3*x)/(b^4*(a*x+b)^2)_ +(-6*a^2)/b^5*log((a*x+b)/x) --R --R (2) --R 4 4 3 3 2 2 2 a x + b 3 3 2 2 2 --R (- 12a x - 24a b x - 12a b x )log(-------) + 12a b x + 18a b x --R x --R + --R 3 4 --R 4a b x - b --R / --R 2 5 4 6 3 7 2 --R 2a b x + 4a b x + 2b x --R Type: Expression Integer --E --S 87 cc:=aa-bb --R --R 2 2 2 a x + b --R - 6a log(a x + b) + 6a log(x) + 6a log(-------) --R x --R (3) ----------------------------------------------- --R 5 --R b --R Type: Expression Integer --E --S 88 divlog:=rule(log(a/b) == log(a) - log(b)) --R --R a --R (4) log(-) == - log(b) + log(a) --R b --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 89 14:79 Schaums and Axiom agree dd:=divlog cc --R --R (5) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.80~~~~~$\displaystyle \int{(ax+b)^n~dx}$} $$\int{(ax+b)^n}= \frac{(ax+b)^{n+1}}{(n+1)a}{\rm\ provided\ }n \ne -1 $$ <<*>>= )clear all --S 90 aa:=integrate((a*x+b)^n,x) --R --R n log(a x + b) --R (a x + b)%e --R (1) ------------------------- --R a n + a --R Type: Union(Expression Integer,...) --E --S 91 bb:=(a*x+b)^(n+1)/((n+1)*a) --R --R n + 1 --R (a x + b) --R (2) -------------- --R a n + a --R Type: Expression Integer --E --S 92 cc:=aa-bb --R --R n log(a x + b) n + 1 --R (a x + b)%e - (a x + b) --R (3) ------------------------------------------ --R a n + a --R Type: Expression Integer --E @ This messy formula can be simplified using the explog rule: <<*>>= --S 93 explog:=rule(%e^(n*log(x)) == x^n) --R --R n log(x) n --R (4) %e == x --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 94 dd:=explog cc --R --R n + 1 n --R - (a x + b) + (a x + b)(a x + b) --R (5) -------------------------------------- --R a n + a --R Type: Expression Integer --E --S 95 14:80 Schaums and Axiom agree ee:=complexNormalize dd --R --R (6) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.81~~~~~$\displaystyle \int{x(ax+b)^n~dx}$} $$\int{x(ax+b)^n}= \frac{(ax+b)^{n+2}}{(n+2)a^2}-\frac{b(ax+b)^{n+1}}{(n+1)a^2} {\rm\ provided\ }n \ne -1,-2 $$ <<*>>= )clear all --S 96 aa:=integrate(x*(a*x+b)^n,x) --R --R 2 2 2 2 n log(a x + b) --R ((a n + a )x + a b n x - b )%e --R (1) --------------------------------------------- --R 2 2 2 2 --R a n + 3a n + 2a --R Type: Union(Expression Integer,...) --E --S 97 bb:=((a*x+b)^(n+2))/((n+2)*a^2)-(b*(a*x+b)^(n+1))/((n+1)*a^2) --R --R n + 2 n + 1 --R (n + 1)(a x + b) + (- b n - 2b)(a x + b) --R (2) -------------------------------------------------- --R 2 2 2 2 --R a n + 3a n + 2a --R Type: Expression Integer --E --S 98 cc:=aa-bb --R --R (3) --R 2 2 2 2 n log(a x + b) n + 2 --R ((a n + a )x + a b n x - b )%e + (- n - 1)(a x + b) --R + --R n + 1 --R (b n + 2b)(a x + b) --R / --R 2 2 2 2 --R a n + 3a n + 2a --R Type: Expression Integer --E --S 99 explog:=rule(%e^(n*log(x)) == x^n) --R --R n log(x) n --R (4) %e == x --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 100 dd:=explog cc --R --R (5) --R n + 2 n + 1 --R (- n - 1)(a x + b) + (b n + 2b)(a x + b) --R + --R 2 2 2 2 n --R ((a n + a )x + a b n x - b )(a x + b) --R / --R 2 2 2 2 --R a n + 3a n + 2a --R Type: Expression Integer --E --S 101 ee:=complexNormalize dd --R --R (6) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.82~~~~~$\displaystyle \int{x^2(ax+b)^n~dx}$} $$\int{x^2(ax+b)^n}= \frac{(ax+b)^{n+2}}{(n+3)a^3}- \frac{2b(ax+b)^{n+2}}{(n+2)a^3}+ \frac{b^2(ax+b)^{n+1}}{(n+1)a^3} {\rm\ provided\ }n \ne -1,-2,-3 $$ <<*>>= )clear all --S 102 aa:=integrate(x^2*(a*x+b)^n,x) --R --R (1) --R 3 2 3 3 3 2 2 2 2 2 3 n log(a x + b) --R ((a n + 3a n + 2a )x + (a b n + a b n)x - 2a b n x + 2b )%e --R ----------------------------------------------------------------------------- --R 3 3 3 2 3 3 --R a n + 6a n + 11a n + 6a --R Type: Union(Expression Integer,...) --E --S 103 bb:=(a*x+b)^(n+3)/((n+3)*a^3)-(2*b*(a*x+b)^(n+2))/((n+2)*a^3)+(b^2*(a*x+b)^(n+1))/((n+1)*a^3) --R --R (2) --R 2 n + 3 2 n + 2 --R (n + 3n + 2)(a x + b) + (- 2b n - 8b n - 6b)(a x + b) --R + --R 2 2 2 2 n + 1 --R (b n + 5b n + 6b )(a x + b) --R / --R 3 3 3 2 3 3 --R a n + 6a n + 11a n + 6a --R Type: Expression Integer --E --S 104 cc:=aa-bb --R --R (3) --R 3 2 3 3 3 2 2 2 2 2 3 --R ((a n + 3a n + 2a )x + (a b n + a b n)x - 2a b n x + 2b ) --R * --R n log(a x + b) --R %e --R + --R 2 n + 3 2 n + 2 --R (- n - 3n - 2)(a x + b) + (2b n + 8b n + 6b)(a x + b) --R + --R 2 2 2 2 n + 1 --R (- b n - 5b n - 6b )(a x + b) --R / --R 3 3 3 2 3 3 --R a n + 6a n + 11a n + 6a --R Type: Expression Integer --E --S 105 explog:=rule(%e^(n*log(x)) == x^n) --R --R n log(x) n --R (4) %e == x --R Type: RewriteRule(Integer,Integer,Expression Integer) --E --S 106 dd:=explog cc --R --R (5) --R 2 n + 3 2 n + 2 --R (- n - 3n - 2)(a x + b) + (2b n + 8b n + 6b)(a x + b) --R + --R 2 2 2 2 n + 1 --R (- b n - 5b n - 6b )(a x + b) --R + --R 3 2 3 3 3 2 2 2 2 2 3 n --R ((a n + 3a n + 2a )x + (a b n + a b n)x - 2a b n x + 2b )(a x + b) --R / --R 3 3 3 2 3 3 --R a n + 6a n + 11a n + 6a --R Type: Expression Integer --E --S 107 14:82 Schaums and Axiom agree ee:=complexNormalize dd --R --R (6) 0 --R Type: Expression Integer --E @ \section{\cite{1}:14.83~~~~~$\displaystyle \int{x^m(ax+b)^n}~dx$} $$\int{x^m(ax+b)^n} \left\{ \begin{array}{l} \displaystyle \frac{x^{m+1}(ax+b)^n}{m+n+1} +\frac{nb}{m+n+1}\int{x^m(ax+b)^{n-1}}\\ \\ \displaystyle \frac{x^{m+1}(ax+b)^{n+1}}{(m+n+1)a} -\frac{mb}{(m+n+1)a}\int{x^{m-1}(ax+b)^n}\\ \\ \displaystyle \frac{-x^{m+1}(ax+b)^{n+1}}{(n+1)b} +\frac{m+n+2}{(n+1)b}\int{x^m(ax+b)^{n+1}}\\ \end{array} \right. $$ <<*>>= --S 108 14:83 Axiom cannot do this integration aa:=integrate(x^m*(a*x+b)^n,x) --R --R x --R ++ m n --I (1) | %U (b + %U a) d%U --R ++ --R Type: Union(Expression Integer,...) --E )spool )lisp (bye) @ \eject \begin{thebibliography}{99} \bibitem{1} Spiegel, Murray R. {\sl Mathematical Handbook of Formulas and Tables}\\ Schaum's Outline Series McGraw-Hill 1968 pp60-61 \end{thebibliography} \end{document}