It is the y-coordinate of the intercept (the x-coordinate being 0).
The real solutions are the points at which the graph of the function crosses the x-axis. If the graph never crosses the x-axis, then the solutions are imaginary.
The quadratic equation has many application related to resolving and modelling daily life problems. two examples are in archery and rifle sports. The trajectory of the projectile can follow a ballistic arc. The arc itself can be explained and graphically illustrated by the quadratic equation.
false they can be related with quadratic equation as well
See related link below for a very good explanation
It is the constant of proportionality.
The real solutions are the points at which the graph of the function crosses the x-axis. If the graph never crosses the x-axis, then the solutions are imaginary.
The quadratic equation has many application related to resolving and modelling daily life problems. two examples are in archery and rifle sports. The trajectory of the projectile can follow a ballistic arc. The arc itself can be explained and graphically illustrated by the quadratic equation.
Quadratic is an adjective that is used to describe something that is related to squares. For example, the quadratic equation uses squares, or the second power, and is thus quadratic.
Standard notation for a quadratic function: y= ax2 + bx + c which forms a parabola, a is positive , minimum value (parabola opens upwards on an x-y graph) a is negative, maximum value (parabola opens downward) See related link.
She was afraid it would be constant. (Constance) She was afraid it would be a related function.
No, the quadratic equation, is mainly used in math to find solutions to quadratic expressions. It is not related to science in any way.
false they can be related with quadratic equation as well
The related link below illustrates 3 ways of drawing a curve. The techniques are easily adapted to a quadratic curve.
The quadratic formula can be derived by used a method called completing the square. It's like using algebra to solve for x. The process is explained the related link "Derivation of Quadratic Formula".
See the related link for details.
See related link below for a very good explanation
In dealing with physiology, function is related to its?