To find p1 and p2 from the expression px = x³ + 2x + 3x + 4, we first need to simplify the equation.
The expression simplifies as follows:
- px = x³ + (2x + 3x) + 4
- Combine the like terms:
- px = x³ + 5x + 4
Now, if we consider p1 and p2 as coefficients pertaining to the variable terms in px, we can conclude that:
- p1 = coefficient of x = 5
- p2 = constant term = 4
Therefore, the values of p1 and p2 are:
- p1 = 5
- p2 = 4
This means that in the polynomial represented, p1 represents the coefficient of the linear term, and p2 represents the constant term.