Maybe we can use the subs() function to do this

f=subs(solve('(x-p)^2+(2-q)^2=d^2') ,{a,b,p,q,d},{1,2,3,4,5})

but here we just can use one equation.

if anyone have other or better method, please show your idea

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Dear everyone,

I want to calculate an equation with letter and variable.

Now I can get the variable value presented with the letters I used

but I don't know how to change the letters as real numbers.

this is the example

%declear syms

syms x0 y0 x1 y1 x2 y2 a b p q d positive;

[x0 y0] = solve('(x-p)^2+(y-q)^2=d^2','(p-a)*(y-b)=(x-a)*(q-b)')

then I can get the result

but the problem is how to enter the real number value of letters like

a = 1;

b = 2;

p = 3;

q = 4;

d = 5;

then I can get the numerical value of x, y ???

Star Strider
on 4 May 2017

The substitution will occur automatically. The problem is that you must put ‘x’, ‘x0’ and ‘y0’ in the equations you want to solve for them.

This will do the substitutions:

syms x0 y0 x1 y1 x2 y2 a b p q d positive

a = 1;

b = 2;

p = 3;

q = 4;

d = 5;

Eq1 = (x-p)^2+(y-q)^2==d^2;

Eq2 = (p-a)*(y-b)==(x-a)*(q-b);

[x0 y0] = solve(Eq1, Eq2);

Karan Gill
on 9 May 2017

Edited: Stephen23
on 17 Oct 2017

Use subs to substitute values, as shown below. You only get one solution because in the other solution, "x" is negative, which is not allowed due to the assumption that it is positive.

BUT if don't substitute values before solving, then you get two solutions because the second solution can be positive under certain conditions. "solve" also issues a warning stating that conditions apply to the solutions. If you use the "ReturnConditions" option, then you get these conditions. Applying these conditions will let you find correct values. See the doc: https://www.mathworks.com/help/symbolic/solve-an-algebraic-equation.html.

syms x y a b p q d positive

eqn1 = (x-p)^2+(y-q)^2 == d^2;

eqn2 = (p-a)*(y-b) == (x-a)*(q-b);

vars = [a b p q d];

vals = sym([1 2 3 4 5]);

eqn1 = subs(eqn1,vars,vals);

eqn2 = subs(eqn2,vars,vals);

[xSol ySol] = solve(eqn1, eqn2)

xSol =

(5*2^(1/2))/2 + 3

ySol =

(5*2^(1/2))/2 + 4

Lastly, do not redeclare symbolic variables as doubles because you are overwriting them. So don't do this.

syms a

a = 1

Just do

a = 1

Or use "subs" to substitute for "a" in an expression

f = a^2

subs(f,a,2)

Karan (Symbolic doc)

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