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How can a quadratic function have both a maximum and minimum point?
Wiki User
∙ 12y ago
It can't - unless you analyze the function restricted to a certain interval.
Wiki User
∙ 12y ago
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How can use a box-and-whisker plot to find the range of a data set?
The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.
What is the formula to calculate maximum random errors?
Maximum Random Error is often calculated by subtracting the average from the data point farthest from the average.
What does peak mean when using line graphs?
The peak of any graph is the highest point (usually in the y direction). The peak is the maximum value.
What is HACCP and explain briefly its function?
HACCP stands for Hazard Analysis Critical Control Point. Its function can be briefly explained as the process in which the handling, production and storage of food is carried out so as to ensure that foods are kept safe.
What does a point represent on a line graph?
A point represents an infinitesimally small area in space. In the case of a line graph, and assuming the point is on the line, it represents the exact value of the linear function of x, f(x) or y, at any given value of x. The important thing to remember is that when you actually draw a dot on a graph representing a point, you're really representing an object with no dimensions.
What name is given to the turning point also known as the maximum or minimum of the graph of a quadratic function?
vertex
What is another name for the maximum or minimum point of a quadratic graph?
Apex.
How do you find the minimum or maximum of a function?
By taking the derivative of the function. At the maximum or minimum of a function, the derivative is zero, or doesn't exist. And end-point of the domain where the function is defined may also be a maximum or minimum.
What is the minimum or maximum point called in a quadratic equation?
They are simply referred to as local minimums and maximums. Experience: Algebra 2 Advanced
How to compute the minimum and maximum function values of a quadratic function?
Suppose you have a quadratic function of the form y = ax2 + bx + c where a, b and c are real numbers and a is non-zero. [If a = 0 it is not a quadratic!] The turning point for this function may be obtained by differentiating the equation with respect to x, or by completing the squares. However you get there, the turning point is the solution to 2ax + b = 0 or x = -b/2a Now, if a > 0 then the quadratic has a minimum at x = -b/2a and it has no maximum because y tends to +∞ as x tends to ±∞ . if a < 0 then the quadratic has a maximum at x = -b/2a and it has no minimum because y tends to -∞ as x tends to ±∞. You evaluate the value of y at this point. y = a(-b/2a)2 + b(-b/2a) + c = b2/4a - b2/2a + c = -b2/4a + c = -(b2 - 4ac)/4a In either case, if the domain of the function is bounded on both sides, then the missing extremum will be at one or the other bound - whichever is further away from (-b/2a).
What is meant by the maximum and minimum values of qadratic equation?
A quadratic can be drawn as a graph and it is either "U" shaped or "n" shaped. If it were "U" shaped, the minimum value qould be the lowest point of the "U". If "n" shaped, maximum would be the top.
What is the extreme point called on a parabola?
The vertex, or maximum, or minimum.
What is the maximum or minimum point called?
A maximum or minimum is generally referred to as an extrema.
Is the graph of a quadratic function contains the point 0 0?
Some do and some don't. It's possible but not necessary.
What is the turning point in the graph of a quadratic function?
The answer depends on the form in which the quadratic function is given. If it is y = ax2 + bx + c then the x-coordinate of the turning point is -b/(2a)
How can use a box-and-whisker plot to find the range of a data set?
The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.The leftmost point is the minimum value.The rightmost point is the maximum value.The difference between them is the range.
How do you know if a point is a maximum or a minimum?
Usually at the minimum or maximum of a function, one of the following conditions arises:The derivative is zero.The derivative is undefined.The point is at the end-points of the domain that is being considered (or of the naturally-defined domain, for example, zero for the square root).This will give you "candidate points"; to find out whether each of these candidate points actually is a maximum or a minimum, additional analysis is required. For example, if the second derivative is positive, you have a minimum, if the second derivative is negative, you have a maximum - but if it is zero, it may be a maximum, a minimum, or neither.
