Solve these unkowns x and y using these 2 simultaneous equations

Question

nathalie am 29 Okt. 2023

0
Verknüpfen

Direkter Link zu dieser Frage

https://de.mathworks.com/matlabcentral/answers/2040216-solve-these-unkowns-x-and-y-using-these-2-simultaneous-equations

Kommentiert: Walter Roberson am 29 Okt. 2023

Eq1= 2760 * sin (200) + m3R3L3 * sin (107) + m4R4L4 * sin (307) = 0
Eq2= 2760 * cos (200) + m3R3l3 * cos (107) + m4R4L4 * cos(307) = 0

I want to get m3r3l3 and m3r4l4 we can consider m3r3l3 as x and m4r4l4 as y

0 Kommentare
-2 ältere Kommentare anzeigen-2 ältere Kommentare ausblenden

Melden Sie sich an, um zu kommentieren.

Melden Sie sich an, um diese Frage zu beantworten.

Answer 1

Walter Roberson am 29 Okt. 2023

0
Verknüpfen

Direkter Link zu dieser Antwort

https://de.mathworks.com/matlabcentral/answers/2040216-solve-these-unkowns-x-and-y-using-these-2-simultaneous-equations#answer_1342996

In MATLAB Online öffnen

syms m3R3l3 m4R4l4

Eq1 = 2760 * sind(sym(200)) + m3R3l3 * sind(sym(107)) + m4R4l4 * sind(sym(307)) == 0

Eq1 =

Eq2 = 2760 * cosd(sym(200)) + m3R3l3 * cosd(sym(107)) + m4R4l4 * cosd(sym(307)) == 0

Eq2 =

sol = solve([Eq1, Eq2])

sol = struct with fields:

m3R3l3: (2760*(cos(pi/9)*sin((53*pi)/180) + cos((53*pi)/180)*sin(pi/9)))/(cos((53*pi)/180)*sin((73*pi)/180) - cos((73*pi)/180)*sin((53*pi)/180)) m4R4l4: (2760*(cos(pi/9)*sin((73*pi)/180) + cos((73*pi)/180)*sin(pi/9)))/(cos((53*pi)/180)*sin((73*pi)/180) - cos((73*pi)/180)*sin((53*pi)/180))

simplify(sol.m3R3l3)

ans =

simplify(sol.m4R4l4)

ans =

2 Kommentare
Keine anzeigenKeine ausblenden

nathalie am 29 Okt. 2023

Yes there any way to solve this final answer to get normal numbers? On matlab?

Walter Roberson am 29 Okt. 2023

In MATLAB Online öffnen

No, π is transcendental. It is mathematically impossible to express it in terms of a finite series of "algebraic numbers". It is not the root of any finite polynomial with rational coefficients. π is one of the most abnormal real numbers that exist.

However you can get a more compact answer than the above:

syms m3R3l3 m4R4l4

Eq1 = 2760 * sind(sym(200)) + m3R3l3 * sind(sym(107)) + m4R4l4 * sind(sym(307)) == 0

Eq1 =

Eq2 = 2760 * cosd(sym(200)) + m3R3l3 * cosd(sym(107)) + m4R4l4 * cosd(sym(307)) == 0

Eq2 =

sol = solve([Eq1, Eq2])

sol = struct with fields:

m3R3l3: (2760*(cos(pi/9)*sin((53*pi)/180) + cos((53*pi)/180)*sin(pi/9)))/(cos((53*pi)/180)*sin((73*pi)/180) - cos((73*pi)/180)*sin((53*pi)/180)) m4R4l4: (2760*(cos(pi/9)*sin((73*pi)/180) + cos((73*pi)/180)*sin(pi/9)))/(cos((53*pi)/180)*sin((73*pi)/180) - cos((73*pi)/180)*sin((53*pi)/180))

simplify(sol.m3R3l3, 'steps', 1000)

ans =

simplify(sol.m4R4l4, 'steps', 1000)

ans =

Melden Sie sich an, um zu kommentieren.