I want to find the intersection point of two lines and then check if that point is equal to a predefined value (here I take it the exact value).
This is my minimum working example,
PROGRAM foo IMPLICIT NONE ! Real kind number INTEGER, PARAMETER :: RKN = 8 ! Parameters of line formulae REAL(RKN) :: a1, b1, c1, a2, b2, c2 ! Exact values REAL(RKN), DIMENSION(2) :: ans ! Points of first line REAL(RKN), DIMENSION(2) :: pnt_a, pnt_b ! Slope of first line REAL(RKN) :: m ! Intersection REAL(RKN), DIMENSION(2) :: x ! Output format CHARACTER(*), PARAMETER :: fmt = '(X, A, X, GO)' pnt_a = [- 4._RKN, - 1._RKN] pnt_b = [- 1._RKN , 0._RKN] m = (pnt_b(2) - pnt_a(2)) / (pnt_b(1) - pnt_a(1)) a1 = m b1 = - 1._RKN c1 = m * pnt_a(1) - pnt_a(2) ! Second line is horizontal and has no vertical intercept a2 = 0._RKN b2 = 1._RKN c2 = 0._RKN ! Cramer's rule x = [(c1 * b2 - b1 * c2) / (a1 * b2 - b1 * a2), (a1 * c2 - c1 * a2) / (a1 * b2 - b1 * a2)] ans = [- 1._RKN, 0._RKN] WRITE(*, fmt) 'x(1) = ', x(1) WRITE(*, fmt) 'ans(1) = ', ans(1) PRINT *, x(1) == ans(1) PRINT *, ABS(x(1) - ans(1)) < EPSILON(1._RKN) END PROGRAM
After compilation, output is,
x(1) = -.9999999999999998 ans(1) = -1.000000000000000 F F
Though reals are double precision, the output is not close enough to exact answer, even using
EPSILON()intrinsic function. If
RKN is set to
16, it produces,
x(1) = -1.00000000000000000000000000000000 ans(1) = -1.00000000000000000000000000000000 F F
How can I handle this type of problems?