Solving Symbolic Equations

This example uses:

Symbolic Math Toolbox Symbolic Math Toolbox

This example shows the basics about solving symbolic equations.

Solve Quadratic Equation

Solve the quadratic equation using the solve function.

Solve the quadratic equation without specifying a variable to solve for. The solve function chooses x to return the solution.

disp('Solve a quadratic equation without specifying which variable to solve for. The solve function chooses x to return a solution.')
disp('>> syms a b c x')
disp('>> eqn = a*x^2 + b*x + c == 0')
disp('>> S = solve(eqn)')
syms a b c x
eqn = a*x^2 + b*x + c == 0
S = solve(eqn)

Solve a quadratic equation without specifying which variable to solve for. The solve function chooses x to return a solution.
>> syms a b c x
>> eqn = a*x^2 + b*x + c == 0
>> S = solve(eqn)
 
eqn =
 
a*x^2 + b*x + c == 0
 
 
S =
 
-(b + (b^2 - 4*a*c)^(1/2))/(2*a)
-(b - (b^2 - 4*a*c)^(1/2))/(2*a)

Specify the variable to solve for and solve the quadratic equation for a.

disp('Solve for the variable a')
disp('Sa = solve(eqn,a)')
Sa = solve(eqn,a)

Solve for the variable a
Sa = solve(eqn,a)
 
Sa =
 
-(c + b*x)/x^2

Solve Multivariate Equations and Assign Outputs to Structure

When solving for multiple variables, it can be more convenient to store the outputs in a structure array than in separate variables. The solve function returns a structure when you specify a single output argument and multiple outputs exist.

Solve a system of equations to return the solutions in a structure array.

disp('Solve a system of equations to return solutions in a structure array')
disp('>> eqns = [2*u + v == 0, u - v == 1];')
disp('>> S = solve(eqns,[u v])')
syms u v
eqns = [2*u + v == 0, u - v == 1];
S = solve(eqns,[u v])

Solve a system of equations to return solutions in a structure array
>> eqns = [2*u + v == 0, u - v == 1];
>> S = solve(eqns,[u v])

S = 

  struct with fields:

    u: 1/3
    v: -2/3

Access the solutions by addressing the elements of the structure.

disp('Access the solutions within the structure')
disp('>> S.u')
S.u
disp('>> S.v')
S.v

Access the solutions within the structure
>> S.u
 
ans =
 
1/3
 
>> S.v
 
ans =
 
-2/3

Using a structure array allows you to conveniently substitute solutions into other expressions. Use the subs function to substitute the solutions S into other expressions.

disp('Use the subs function to substitute the solutions into other expressions')
disp('>> e1 = subs(u^2, S)')
e1 = subs(u^2,S)
disp('>> e2 = subs(3*v + u, S)')
e2 = subs(3*v + u,S)

Use the subs function to substitute the solutions into other expressions
>> e1 = subs(u^2, S)
 
e1 =
 
1/9
 
>> e2 = subs(3*v + u, S)
 
e2 =
 
-5/3

If the solve function returns an empty object, then no solutions exist.

disp('The solve function returns an empty object if no solutions exist')
disp('>> solve([3*u+2, 3*u+1],u)')
S = solve([3*u+2, 3*u+1],u)

The solve function returns an empty object if no solutions exist
>> solve([3*u+2, 3*u+1],u)
 
S =
 
Empty sym: 0-by-1

Numerically Solve Equations

When the solve function cannot symbolically solve an equation, it tries to find a numeric solution using the vpasolve function. The vpasolve function returns the first solution found.

Try solving the following equation. The solve function returns a numeric solution because it cannot find a symbolic solution.

disp('The following equation returns a numeric solution because the solve function cannot find a symbolic solution')
syms x
disp('>> eqn = sin(x) == x^2 - 1;')
eqn = sin(x) == x^2 - 1;
disp('>> solve(eqn,x)')
S = solve(eqn,x)

The following equation returns a numeric solution because the solve function cannot find a symbolic solution
>> eqn = sin(x) == x^2 - 1;
>> solve(eqn,x)
Warning: Unable to solve symbolically. Returning a numeric solution using <a
href="matlab:web(fullfile(docroot, 'symbolic/vpasolve.html'))">vpasolve</a>. 
 
S =
 
-0.63673265080528201088799090383828

Plot the left and the right sides of the equation. Observe that the equation also has a positive solution.

disp('Plot the left and right sides of the equation to see that the equation also has a positive solution')
disp('>> fplot([lhs(eqn) rhs(eqn)], [-2 2])')
fplot([lhs(eqn) rhs(eqn)], [-2 2])

Plot the left and right sides of the equation to see that the equation also has a positive solution
>> fplot([lhs(eqn) rhs(eqn)], [-2 2])

Find the other solution by directly calling the numeric solver vpasolve and specifying the interval.

disp('Find the other solution by calling the numeric solver vpasolve')
disp('>> V = vpasolve (eqn,x,[0,2])')
V = vpasolve(eqn,x,[0 2])

Find the other solution by calling the numeric solver vpasolve
>> V = vpasolve (eqn,x,[0,2])
 
V =
 
1.4096240040025962492355939705895