Convert decimal number to rational: Difference between revisions

Program to convert a decimal number to fraction.

For transform a decimal to a fraction, previously we have to know what type is the decimal number, here are some examples

'Examples of types decimal numbers:

67 / 74 = 0.9054054 >>> Mixed decimal number

42 / 81 = 0.518518 >>> Pure decimal number

3/4 = 0.75 >>> Exact decimal number

Option >>>

4527027/ 5000000 = 0.9054054

259259/ 500000 = 0.518518

3/ 4 = 0.75

Task Description

1. Write a function/routine/method/... that transform a decimal number to fraction.

BASIC

<lang qbasic> 'Program to transform a decimal to a fraction 'LRCVS 11.06.11

'program to transform a decimal number to fraction declare sub exacto (a$) declare sub puro (a$, b$()) declare sub mixto (a$, b$()) declare function factor (j , k ) as integer

dim as integer l, r, s, t, k, w1, i, m, x, ll, pp, ps, u, v, j

dim as string a, c, d, a2

dim y () as string dim w2 () as string

cls input "Decimal number = ";a$ a2$ = a$ print if instr(a$,".") = 0 then print "It's not a decimal number " : goto 100 cls l = len(a$)

for r = 1 to l for s = 1 to l if s + r = l + 2 then exit for k = k + 1 next s next r

w1 = k redim y$(w1) redim b$(w1)

k = 0 for r = 1 to l for s = 1 to l c$ = mid$(a$,r,s) if s + r = l + 2 then exit for if len(c$) <= int(l/2) then k = k + 1 : y$(k) = c$ next s next r t = 0

for r = 1 to k i = 0 f = 0 x = 0 m = 0 if i = 0 then i = instr(a$,y$(r)):x = 1 for s = 1 to len(a$) if x = 1 then f = instr(s,a$,y$(r)) if x = 1 and f > m then m = f next s

h = 0 k = 0 for n = i to m step len(y$(r)) if h = 0 and mid$(a$,n,len(y$(r))) = y$(r) then k = k + 1 else h = 1 next n if k > 1 then t = t + 1 :b$(t) = y$(r) next r

for r = 1 to w1 for s = r + 1 to w1 if b$(r) = b$(s) then b$(s) = "" next s next r

print "decimal number = ";a$ print

ll = len(a$) pp = instr(a$,".") d$ = mid$(a$,pp+1,ll) ps = instr(d$,b$(1)) if ps = 0 then

               print "Decimal number exact"
               print
               call exacto (a$)
               end if

if ps = 1 then

               print "Decimal number pure"
               print
               call puro (a$, b$())
               end if

if ps > 1 then

                print "Decimal number mix"
                print
                call mixto (a$, b$())
                end if

100: print print "End" sleep end

':::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::: sub exacto (a as string) dim as integer b, c, d, g, may, j, k, l, r, s, u, v, w, f dim as string z, h, g1 b = len(a$) c = instr(a$,".") d = b - c g = int(val(a$)) h$ = right$(a$, b - c)

may = 0 j = 10^d k = val(h$) for n = 9 to 1 step - 1 if j mod (1*(10^n)) = 0 and k mod (1*(10^n)) = 0 then j = j/(1*(10^n)) : k = k/(1*(10^n)) :exit for next n l = factor (j,k) u = k/l v = j/l w = (g * v) + u print print w;"/";v ;" = " ;w/v

end sub

':::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::: sub puro (a as string, b() as string) dim as integer b2, c, d, g, may, j, k, l, u, v, w, f, lr,x5 dim as string z, h, g1, x, a3

z$ = b$(1) x5 = int(val(a$)) lr = len (z$) b2 = len (a$) c = instr (a$,".") g = int (val(a$)) b2 = len(z$) + 1 + len(str$(g)) a3$ = str$(g) + "." + z$ h$ = right$(a3$, b2 - c)

may = 0 x$ = "" for n = 1 to lr x$ = x$ + "9" next n

j = val(x$) k = val(h$)

for n = 9 to 1 step - 1 if j mod (1*(10^n)) = 0 and k mod (1*(10^n)) = 0 then j = j/(1*(10^n)) : k = k/(1*(10^n)) :exit for next n l = factor (j,k) u = k/l v = j/l w = (g * v) + u print w;"/";v ;" = ";w/v print print "Option >>> " call exacto (a$)

end sub

':::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::: sub mixto (a as string, b() as string)

dim as integer b3, c, d, g, j, k, l, u, v, w, f, lr, lz, ly, x5 dim as string z, h, g4, g7, x, y

z$ = b$(1) x5 = int(val(a$)) w = instr(a$, z$) v = instr(a$,".") y$ = mid$(a$,v+1,w-v-1) lz = len(z$) ly = len(y$) b3 = (val(y$)*(9*(10^ly))) + ((1*(10^ly))* (val(z$))) c = (9*(10^ly))*(1*(10^ly)) j = b3 k = c for n = 9 to 1 step - 1 if j mod (1*(10^n)) = 0 and k mod (1*(10^n)) = 0 then j = j/(1*(10^n)) : k = k/(1*(10^n)): exit for next n l = factor (b3,c) u = k/l v = j/l if x5 <> 0 then print (x5*v)+ u;"/";u ;" = ";((x5*v)+ u)/u else print v;"/";u;" = "; v/u print print "Option >>> " call exacto (a$) end sub ':::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::::: function factor (j as integer, k as integer) as integer dim as integer may, n, s, r, l5, j5, k5 may = 0 l5 = 1 j5 = j k5 = k for n = 9 to 1 step - 1 if j5 mod (1*(10^n)) = 0 and k5 mod (1*(10^n)) = 0 then j5 = j5/(1*(10^n)) : k5 = k5/(1*(10^n)): exit for next n if j5 > k5 then may = j5 else may = k5 for n = may to 1 step - 1

  r = (j5 mod n)
  s = (k5 mod n)
  if r = 0 and s = 0  then l5 = n :exit for

next n factor = l5 end function end</lang>

Python

Note that the decimal values of the task description are truncated in some cases.

The first loop limits the size of the denominator the second uses the Decimal module to convert an accurate Decimal representation of the given values to a fraction. <lang python>>>> from fractions import Fraction >>> for d in (0.9054054, 0.518518, 0.75): print(d, Fraction(d).limit_denominator(100))

0.9054054 67/74 0.518518 14/27 0.75 3/4 >>> from decimal import Decimal >>> for d in '0.9054054 0.518518 0.75'.split(): print(d, Fraction(Decimal(d)))

0.9054054 4527027/5000000 0.518518 259259/500000 0.75 3/4 >>> </lang>