Inverse tangent inaccuracy?

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Robert Waechter
Robert Waechter on 4 Nov 2017
Commented: Robert Waechter on 4 Nov 2017
I wrote a program to calculate the open and crossed angle values of a four bar mechanism and everything seems to work fine until I get to the final calculation in which I try to take the inverse tangent of the quadratic equation and the resulting answers are incorrect. Here is my code.
L1=6;
L2=2;
L3=7;
L4=9;
theta2=30*(pi/180);
a=L2;
b=L3;
c=L4;
d=L1;
K1=d/a;
K2=d/c;
K3=(a^2-b^2+c^2+d^2)/(2*a*c);
K4=d/b;
K5=(c^2-d^2-a^2-b^2)/(2*a*b);
A=cos(theta2)-K1-(K2*cos(theta2))+K3;
B=-2*sin(theta2);
C=K1-((K2+1)*cos(theta2))+K3;
D=cos(theta2)-K1+(K4*cos(theta2))+K5;
E=B;
F=K1+((K4-1)*cos(theta2))+K5;
theta4a=2*(atand(-B+sqrt((B^2)-(4*A*C))/(2*A)))
theta4b=2*(atand(-B-sqrt((B^2)-(4*A*C))/(2*A)))
theta3a=2*(atand(-E+sqrt((E^2)-(4*D*F))/(2*D)))
theta3b=2*(atand(-E-sqrt((E^2)-(4*D*F))/(2*D)))
The values I get for answers are:
theta4a = -106.6958
theta4b = 146.7016
theta3a = -31.0711
theta3b = 132.5987
The resulting correct answers should be:
theta4a = -143.67
theta4b = 117.32
theta3a = -115.21
theta3b = 88.84
I can't seem to find the problem any help would be appreciated. Thanx!

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Accepted Answer

David Goodmanson
David Goodmanson on 4 Nov 2017
Hi Robert,
All you need do is replace the expression for theta4a by
theta4a = 2*atand((-B +sqrt((B^2)-(4*A*C)))/(2*A))
and similarly for the other three. You forgot that 2A divides -B as well as the sqrt term.
  1 Comment
Robert Waechter
Robert Waechter on 4 Nov 2017
I knew it must've been something simple like that. Thanx!

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