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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?

4
  • 1
    C doesn't have an exponent operator. You have to do repeated multiplication.
    – dbush
    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

4 Answers 4

5

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.

3

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;
}

Addendum:

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.

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  • ((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.
    – Rietty
    Commented Feb 5, 2019 at 1:56
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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

1

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.

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