A quadratic equation could be used to find the optimal ingredients for a mixture.
Example: if you are trying to create a super cleanser, you could make a parabola of your ingredients, finding the roots of the equation to find the optimal amount for each ingredient.
You'll find "real-life applications" of the quadratic equation mainly in engineering applications, not in sustainable development.
examples of quadratic equation in word problem form with real life situations like sports baseball, hockey
A quadratic equation can have either two real solutions or no real solutions.
If the discriminant of b2-4ac in the quadratic equation formula is less than zero then the equation will have no real roots.
If the discriminant of the quadratic equation is zero then it will have 2 equal roots. If the discriminant of the quadratic equation is greater than zero then it will have 2 different roots. If the discriminant of the quadratic equation is less than zero then it will have no roots.
You'll find "real-life applications" of the quadratic equation mainly in engineering applications, not in sustainable development.
How about the path a baseball takes when hit by a bat...
When you are trying to find the unknown concentrations in equilibrium reaction ( chemistry ) the result if the ICE table set up devolves into a quadratic equation. Happens in physics to.
Quadratic functions are used to describe free fall.
The quadratic has no real solutions.
If the discriminant of a quadratic equation is less then 0 then it will have no real solutions.
examples of quadratic equation in word problem form with real life situations like sports baseball, hockey
A quadratic equation can have either two real solutions or no real solutions.
If the discriminant of b2-4ac in the quadratic equation formula is less than zero then the equation will have no real roots.
Is it possible for a quadratic equation to have no real solution? please give an example and explain. Thank you
If the discriminant of the quadratic equation is zero then it will have 2 equal roots. If the discriminant of the quadratic equation is greater than zero then it will have 2 different roots. If the discriminant of the quadratic equation is less than zero then it will have no roots.
Yes, they commonly appear in free-fall problems.