# How do I translate a polynomial with C programming without exponent operators?

I was looking in my C textbook and inside there was a page where the prompt told me to translate a polynomial into C code. We have not discussed exponent operators yet and are specifically instructed not to use them at this point and find another way with basic operators. The polynomial goes as such: `5x^(2)+3x-2`.

How do I do this?

• C doesn't have an exponent operator. You have to do repeated multiplication. Commented Feb 4, 2019 at 20:48
• Exactly. And don't listen to those who suggest the pow() function. For simple small-integer degree polynomials, just use ` x*x`, `x*x*x`, etc. Commented Feb 4, 2019 at 20:56
• @LeeDanielCrocker In fact the `pow` function seems expressly forbidden by this exercise, which asks for the exponentiation to be achieved through basic operators Commented Feb 4, 2019 at 20:59
• Even a more complex expression does not always need a power or a factorial function, such as a Maclaurin series, where each term can be based on the previous term and summed to the series. Commented Feb 4, 2019 at 21:05

Note that `ax^2 + bx + c` can be written as

``````c + x*(b + x*(a))
``````

This can easily be extended to any order of polynomial.

There is no such thing as an `exponent operator` in C. While you can accomplish the same thing using `pow()`. I suspect your book does not want this. Given this limitation you can do the operation of `x^2` as simply `x * x` where `x` is a variable for your function.

i.e. You can do something like this:

``````int poly(int x) {
int y = ((5 * x * x) + (3 * x) - 2);
return y;
}
``````

If you want to have a general formula that you can easily extend for any polynomial degree, you can use this formula instead, with inputs for `a`, `b`, `c` and `x`:

``````int poly(int a, int b, int c, int x) {
int y = c + x*(b + x*(a));
return y;
}
``````

Thanks to chux and FredK for this.

• `((5 * x * x) + (3 * x) - 2)` is mathematically the same as `c + x*(b + x*(a))`, yet the 2nd one is more numerically stable (less rounding error.) - often less code too. Commented Feb 5, 2019 at 1:49
• @chux I'll note that. Commented Feb 5, 2019 at 1:56

I think you should parameter a,b,c and x in the second polynomial function

``````int poly2(int a, int b, int c, int x)
{
int y = a*x*x+b*x+c;
return y;
}
``````

when using this function for your case you can call

``````int result = poly2(a,b,c, x)
``````

with a specific set of a,b,c,x

C doesn't have an exponent operator.

One really handy way to model polynomials is to use an array to store the coefficients, such that the array index corresponds to the power of `x`. IOW, to model `5x2 + 3x - 2`, use

``````double coef[] = {-2.0, 3.0, 5.0}; // -2.0 + 3.0x + 5.0x^2
``````

To evaluate the polynomial, use a loop, taking into account the property that FredK mentions in his answer - `5x2 + 3x - 2 == ((5)x + 3)x - 2`:

``````size_t num_elements = sizeof coef / sizeof coef[0]; // yields 3 in this case
double result = 0;
for (size_t i = num_elements - 1; i > 0; i--)
result += x * ( result + coef[i] );
result += coef[0];
``````

This method will work for polynomials of any degree.