jhasmany-fernandez · July 15, 2021 20:30
diff --git a/Problemas Naturaleza Recursiva.pl b/Problemas Naturaleza Recursiva.pl
 % ---------------------------------------------+          
 % GRUPO: 11                                    |   ╔═══╗ ♪
 % NOMBRE: FERNANDEZ ORTEGA JHASMANY JHUNNIOR   |   ║███║ ♫ 
 % MATERIA: INF 318 - SA                        |   ║ (●) ♫ 
 % ---------------------------------------------+   ╚═══╝♪♪ 

 %                       |---------------------------------------------+
 %                       |PROBLEMAS DE NATURALEZA RECURSIVA.           |
 %                       |_____________________________________________+

 % Factorial.
 fact(0,1):-!.
 fact(N,F):- N1 is (N-1),
            fact(N1,F1),
            F is (N*F1).

 % Potencia.
 pot(_,0,1):-!.
 pot(X,N,P):-N1 is (N-1),
            pot(N,N1,P1),
            P is (X*P1).

 potencia(X,N,P):-pot(1,X,N,Po),P is Po.
 pot(I,_,N,1):-I>N,!.
 pot(I,X,N,P):-I1 is I+1,
 		pot(I1,X,N,P1),
 		P is P1*X.

 % Fibonacci.
 fibo(1,0):-!.
 fibo(2,1):-!.
 fibo(N,F):-	N1 is N-1,
 			N2 is N-2,
 			fibo(N1,F1),
 			fibo(N2,F2),
 			F is F1+F2.

 % Números Combinatorios.
 combi(N,N,1):-!.
 combi(_,0,1):-!.
 combi(N,R,NR):-N1 is (N-1),
               R1 is (R-1),
 			   combi(N1,R,N2),
 			   combi(N1,R1,N3),
 			   NR is N2+N3.

 % Al menos 6 problemas adicionales cualesquiera.
 %1)
 sumaEnteros(N,Sum):-suma(1,N,S),Sum is S.
 
 suma(I,N,0):-I>N,!.
 suma(I,N,S):-I1 is I+1,
 		suma(I1,N,S1),
 		S is S1+I.	
 %2)	
 sumaPares(N,Sum):-sumapar(1,N,S),Sum is S.
 
 sumapar(I,N,0):-I>N,!.
 sumapar(I,N,S):-I1 is I+1,
 		sumapar(I1,N,S1),
 		S is S1+(2*I).	
 %3)		
 sumaImpares(N,Sum):-sumaimpar(1,N,S),Sum is S.
 
 sumaimpar(I,N,0):-I>N,!.
 sumaimpar(I,N,S):-I1 is I+1,
 		sumaimpar(I1,N,S1),
 		S is S1+((2*I)-1).
 %4)
 sumapot(X,N,Sum):-sumpot(X,N,0,S),Sum is S.
 sumpot(_,N,I,0):-I>N,!.
 sumpot(X,N,I,S):-I1 is I+1,
 		  sumpot(X,N,I1,S1),
 		  potencia(X,I,P),
 		  S is S1+P. 
 %5)
 sumacoef(N,Sum):-sumcoef(N,0,S),Sum is S.
 sumcoef(N,R,0):-R>N,!.
 sumcoef(N,R,S):-R1 is R+1,
 		 sumcoef(N,R1,S1),
 		 combi(N,R,C),
 		 S is S1+C.
 %6)
 pitagoras2(N):-cicloA2(N,1).

 cicloA2(N,A):-A>N,!.
 cicloA2(N,A):-cicloB2(N,A,A),
 		A1 is A+1,
 		cicloA2(N,A1).

 cicloB2(N,_,B):-B>N,!.
 cicloB2(N,A,B):-cicloC2(A,B,B),
 		B1 is B +1,
 		cicloB2(N,A,B1).
 		
 %----------------------------------------------------------------+
 %		TAREA GRUPAL.                                     |
 %	Implementar al menos 6 problemas con naturaleza recursiva |
 %----------------------------------------------------------------+


 % #1)-------------------------------------------------+  
 %  cuadrado(N,R) : Devuelve el cuadrado de un numero  |
 % ----------------------------------------------------+ 
 
 cuadrado(1,1).
 
 cuadrado(N,C):-N1 is N-1,
 		cuadrado(N1,C1),
 		C is C1+2*N1+1.



 % #2)-------------------------------------------+
 % invertir(N,R) : Devuelve el numero invertido  |
 % ----------------------------------------------+
 
 invertir(N,R):-N<10,R is N.

 invertir(N,R):-D is N mod 10,
 		N1 is N//10,
 		invertir(N1,R1), 
 		candig(R1,C),
 		R is (10**C)*D+R1.


 	
 % #3)----------------------------------------------------------+
 % candig(N,R) : Devuelve la cantidad de digitos de un numero   |
 % -------------------------------------------------------------+

 candig(N,R):-N<10,R is 1.
 
 candig(N,R):-N1 is N//10,
 		candig(N1,R1),
 		R is R1+1.	



 % #4)----------------------------------------------------+
 % suma(N,R) : Devuelve la suma de  0 a N numeros dados   |
 % -------------------------------------------------------+

 suma(0,0).
 
 suma(N,R):-N1 is N-1,
 		suma(N1,R1),
 		R is R1+N.	



 % #5)-------------------------------------------------------+
 % sumapar(N,R) : Devuelve la suma de  0 a N numeros pares   |
 % ----------------------------------------------------------+

 sumapar(0,0).
 
 sumapar(N,S):-	N mod 2 =:= 0,
 		N1 is N - 1,
 		sumapar(N1,S1),
 		S is S1 + N.

 sumapar(N,S):- N1 is N - 1,sumapar(N1,S).



 % #6)-----------------------------------------------------+
 % frecuencia(N,D,R): Devuelve frecunecia de un digito     |
 % --------------------------------------------------------+

 frecuencia(N,D,F):-N<10, N=:=D, F is 1.
 frecuencia(N,D,F):-N<10, N=\=D, F is 0.

 frecuencia(N,D,F):-D1 is N mod 10, D1=:=D,
 			N1 is N//10,
 			frecuencia(N1,D,F1),
 			F is F1+1.

 frecuencia(N,D,F):-N1 is N//10,  frecuencia(N1,D,F).



 % #7)--------------------------------------------------+
 % eliminar(N,D,R) : Elimina un digito de un numero     |
 % -----------------------------------------------------+

 eliminar(0,_,0).
 
 eliminar(N,D,R):-D1 is N mod 10,
 		N1 is N // 10,
 		D =\= D1,
 		eliminar(N1,D,R1),
 		R is R1*10+D1.

  eliminar(N,D,R1):-N1 is N // 10,eliminar(N1,D,R1).



 % #8)----------------------------------------------------------+ 
 % sumdig(N,R) : Devuelve la suma de los digitos de un numero   |
 % -------------------------------------------------------------+
 
 sumadig(N,R):-N<10,R is N.

 sumadig(N,R):-D is N mod 10,
 		N1 is N//10,
 		sumadig(N1,R1),
 		R is R1+D.



 % #9)------------------------------------------------------------------+
 % sumdigpar(N,R): Devuelve al suma de los digitos pares de un numero   | 
 % ---------------------------------------------------------------------+
 sumdigpar(0,0).

 sumdigpar(N,R):-D is N mod 10,
 		N1 is N//10,
 		D mod 2=:=0, 
 		sumdigpar(N1,R1),
 		R is R1+D.

 sumdigpar(N,R):-N1 is N//10, sumdigpar(N1,R).



 % #10)----------------------------------------------------+
 % multlip(A,B,R): Devuelve la multiplicion de 2 numeros   |
 %---------------------------------------------------------+

 multip(_,0,0).
 multip(0,_,0).
 multip(A,1,A).
 multip(1,B,B).

 multip(A,B,R):-B1 is B-1,
 		multip(A,B1,R1),
 		R is R1+A.

 % #11)---------------------------------------------------------+
 % mcd(A,B,C) : Devuelve el maximo comun divisor de 2 numeros   |
 % -------------------------------------------------------------+

 mcd(A,B,R):-A mod B=:=0, R is B.

 mcd(A,B,R):-B1 is A mod B,
 		mcd(B,B1,R).
 		


 % #12)-----------------------------------------------------+
 % decabin(A,[]) : Convierte un numero decimal a binario    |
 % ---------------------------------------------------------+

 decabin(N,[]):-N<2, C is N+48, put(C).

 decabin(N,[]):-M is (N mod 2)+48, 
 		N1 is N//2,
 		decabin(N1,[]),
 		put(M).		

 %-------------------------- FIN TAREA RECURSIVIDAD ----------------------*
	% ---------------------------------------------+
	% GRUPO: 11 \| ╔═══╗ ♪
	% NOMBRE: FERNANDEZ ORTEGA JHASMANY JHUNNIOR \| ║███║ ♫
	% MATERIA: INF 318 - SA \| ║ (●) ♫
	% ---------------------------------------------+ ╚═══╝♪♪

	% \|---------------------------------------------+
	% \|PROBLEMAS DE NATURALEZA RECURSIVA. \|
	% \|_____________________________________________+

	% Factorial.
	fact(0,1):-!.
	fact(N,F):- N1 is (N-1),
	fact(N1,F1),
	F is (N*F1).

	% Potencia.
	pot(_,0,1):-!.
	pot(X,N,P):-N1 is (N-1),
	pot(N,N1,P1),
	P is (X*P1).

	potencia(X,N,P):-pot(1,X,N,Po),P is Po.
	pot(I,_,N,1):-I>N,!.
	pot(I,X,N,P):-I1 is I+1,
	pot(I1,X,N,P1),
	P is P1*X.

	% Fibonacci.
	fibo(1,0):-!.
	fibo(2,1):-!.
	fibo(N,F):- N1 is N-1,
	N2 is N-2,
	fibo(N1,F1),
	fibo(N2,F2),
	F is F1+F2.

	% Números Combinatorios.
	combi(N,N,1):-!.
	combi(_,0,1):-!.
	combi(N,R,NR):-N1 is (N-1),
	R1 is (R-1),
	combi(N1,R,N2),
	combi(N1,R1,N3),
	NR is N2+N3.

	% Al menos 6 problemas adicionales cualesquiera.
	%1)
	sumaEnteros(N,Sum):-suma(1,N,S),Sum is S.

	suma(I,N,0):-I>N,!.
	suma(I,N,S):-I1 is I+1,
	suma(I1,N,S1),
	S is S1+I.
	%2)
	sumaPares(N,Sum):-sumapar(1,N,S),Sum is S.

	sumapar(I,N,0):-I>N,!.
	sumapar(I,N,S):-I1 is I+1,
	sumapar(I1,N,S1),
	S is S1+(2*I).
	%3)
	sumaImpares(N,Sum):-sumaimpar(1,N,S),Sum is S.

	sumaimpar(I,N,0):-I>N,!.
	sumaimpar(I,N,S):-I1 is I+1,
	sumaimpar(I1,N,S1),
	S is S1+((2*I)-1).
	%4)
	sumapot(X,N,Sum):-sumpot(X,N,0,S),Sum is S.
	sumpot(_,N,I,0):-I>N,!.
	sumpot(X,N,I,S):-I1 is I+1,
	sumpot(X,N,I1,S1),
	potencia(X,I,P),
	S is S1+P.
	%5)
	sumacoef(N,Sum):-sumcoef(N,0,S),Sum is S.
	sumcoef(N,R,0):-R>N,!.
	sumcoef(N,R,S):-R1 is R+1,
	sumcoef(N,R1,S1),
	combi(N,R,C),
	S is S1+C.
	%6)
	pitagoras2(N):-cicloA2(N,1).

	cicloA2(N,A):-A>N,!.
	cicloA2(N,A):-cicloB2(N,A,A),
	A1 is A+1,
	cicloA2(N,A1).

	cicloB2(N,_,B):-B>N,!.
	cicloB2(N,A,B):-cicloC2(A,B,B),
	B1 is B +1,
	cicloB2(N,A,B1).

	%----------------------------------------------------------------+
	% TAREA GRUPAL. \|
	% Implementar al menos 6 problemas con naturaleza recursiva \|
	%----------------------------------------------------------------+


	% #1)-------------------------------------------------+
	% cuadrado(N,R) : Devuelve el cuadrado de un numero \|
	% ----------------------------------------------------+

	cuadrado(1,1).

	cuadrado(N,C):-N1 is N-1,
	cuadrado(N1,C1),
	C is C1+2*N1+1.



	% #2)-------------------------------------------+
	% invertir(N,R) : Devuelve el numero invertido \|
	% ----------------------------------------------+

	invertir(N,R):-N<10,R is N.

	invertir(N,R):-D is N mod 10,
	N1 is N//10,
	invertir(N1,R1),
	candig(R1,C),
	R is (10*C)D+R1.



	% #3)----------------------------------------------------------+
	% candig(N,R) : Devuelve la cantidad de digitos de un numero \|
	% -------------------------------------------------------------+

	candig(N,R):-N<10,R is 1.

	candig(N,R):-N1 is N//10,
	candig(N1,R1),
	R is R1+1.



	% #4)----------------------------------------------------+
	% suma(N,R) : Devuelve la suma de 0 a N numeros dados \|
	% -------------------------------------------------------+

	suma(0,0).

	suma(N,R):-N1 is N-1,
	suma(N1,R1),
	R is R1+N.



	% #5)-------------------------------------------------------+
	% sumapar(N,R) : Devuelve la suma de 0 a N numeros pares \|
	% ----------------------------------------------------------+

	sumapar(0,0).

	sumapar(N,S):- N mod 2 =:= 0,
	N1 is N - 1,
	sumapar(N1,S1),
	S is S1 + N.

	sumapar(N,S):- N1 is N - 1,sumapar(N1,S).



	% #6)-----------------------------------------------------+
	% frecuencia(N,D,R): Devuelve frecunecia de un digito \|
	% --------------------------------------------------------+

	frecuencia(N,D,F):-N<10, N=:=D, F is 1.
	frecuencia(N,D,F):-N<10, N=\=D, F is 0.

	frecuencia(N,D,F):-D1 is N mod 10, D1=:=D,
	N1 is N//10,
	frecuencia(N1,D,F1),
	F is F1+1.

	frecuencia(N,D,F):-N1 is N//10, frecuencia(N1,D,F).



	% #7)--------------------------------------------------+
	% eliminar(N,D,R) : Elimina un digito de un numero \|
	% -----------------------------------------------------+

	eliminar(0,_,0).

	eliminar(N,D,R):-D1 is N mod 10,
	N1 is N // 10,
	D =\= D1,
	eliminar(N1,D,R1),
	R is R1*10+D1.

	eliminar(N,D,R1):-N1 is N // 10,eliminar(N1,D,R1).



	% #8)----------------------------------------------------------+
	% sumdig(N,R) : Devuelve la suma de los digitos de un numero \|
	% -------------------------------------------------------------+

	sumadig(N,R):-N<10,R is N.

	sumadig(N,R):-D is N mod 10,
	N1 is N//10,
	sumadig(N1,R1),
	R is R1+D.



	% #9)------------------------------------------------------------------+
	% sumdigpar(N,R): Devuelve al suma de los digitos pares de un numero \|
	% ---------------------------------------------------------------------+
	sumdigpar(0,0).

	sumdigpar(N,R):-D is N mod 10,
	N1 is N//10,
	D mod 2=:=0,
	sumdigpar(N1,R1),
	R is R1+D.

	sumdigpar(N,R):-N1 is N//10, sumdigpar(N1,R).



	% #10)----------------------------------------------------+
	% multlip(A,B,R): Devuelve la multiplicion de 2 numeros \|
	%---------------------------------------------------------+

	multip(_,0,0).
	multip(0,_,0).
	multip(A,1,A).
	multip(1,B,B).

	multip(A,B,R):-B1 is B-1,
	multip(A,B1,R1),
	R is R1+A.

	% #11)---------------------------------------------------------+
	% mcd(A,B,C) : Devuelve el maximo comun divisor de 2 numeros \|
	% -------------------------------------------------------------+

	mcd(A,B,R):-A mod B=:=0, R is B.

	mcd(A,B,R):-B1 is A mod B,
	mcd(B,B1,R).



	% #12)-----------------------------------------------------+
	% decabin(A,[]) : Convierte un numero decimal a binario \|
	% ---------------------------------------------------------+

	decabin(N,[]):-N<2, C is N+48, put(C).

	decabin(N,[]):-M is (N mod 2)+48,
	N1 is N//2,
	decabin(N1,[]),
	put(M).

	%-------------------------- FIN TAREA RECURSIVIDAD ----------------------*