If one of the zeros of the cubic polynomial x cube + ax square + bx + c is -1 then find the product of the other two zeros
Answers
There are two forms of quadratic functions. The first is vertex form. This is f(x) = a(x-h)(Square)+k. A is the slope and (h,k) is the vertex. The other form is f(x) = ax(squared) + bx + c. This offers us the slope and y intercept. Quadratic functions end behaviors consistently start and end high, however if a is negative it will start low and end low. There are no asymptotes. Quadratic functions are unbounded. There are a few ways to find the zeros of a quadratic function. The first is to factor and use the zero product property. The next is to use the quadratic formula. Finally, you can also set x = 0 and solve. Remember, always check for extraneous solutions. In standard for c is the y-intercept, but you can also just set x=0 and solve for y. The domain and range of a quadratic function is all real numbers. One way we can apply quadratic functions is with projectile motion. The functions is h(x) = -16t(Squared) + (vnot)(sine(a)) + c where c is initial height. We input the values and solve the function to find values like time and height in a projectile motion.