How Do Changes in a, b, and c Values Affect the Graph of a Quadratic Equation?

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Discussion Overview

The discussion centers on how changes in the coefficients a, b, and c of the quadratic equation ax² + bx + c = 0 affect the graph of the corresponding quadratic function. Participants explore theoretical implications, graphical representations, and relationships between the coefficients.

Discussion Character

  • Exploratory
  • Technical explanation
  • Conceptual clarification
  • Debate/contested
  • Mathematical reasoning

Main Points Raised

  • Some participants suggest that increasing a or c raises the value of the function for all x, while increasing b raises the function for positive x but lowers it for negative x.
  • There is a claim that if c = 0, the graph is not necessarily symmetrical about the origin, but rather symmetrical if b = 0.
  • One participant notes that if a > 0, the parabola opens upward, and if a < 0, it opens downward, with implications for the vertex's position based on the values of b and c.
  • A later reply introduces a physical analogy involving constant acceleration, suggesting that changes in a, b, and c can be understood in terms of motion parameters.
  • Another participant emphasizes the importance of distinguishing between the equation ax² + bx + c = 0 and the function y = ax² + bx + c, indicating a potential misunderstanding in terminology.

Areas of Agreement / Disagreement

Participants express differing views on the symmetry of the graph when c = 0 and the relationships between the coefficients. No consensus is reached regarding the implications of varying a, b, and c on the graph's characteristics.

Contextual Notes

Some statements rely on assumptions about the values of a, b, and c, and there are unresolved mathematical steps regarding the implications of these coefficients on the graph's properties.

roger
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Dear members,

For the general equation ax^2 + BX + C = 0 ,

what does increasing/decreasing the a, b and c values do to the graph ?

Are they related to each other or not ?

If C was 0 will the graph always be symmetrical about the origin or is this my misunderstanding ?


Thankyou for any help.

From Roger
 
Mathematics news on Phys.org
roger said:
Dear members,

For the general equation ax^2 + BX + C = 0 ,

what does increasing/decreasing the a, b and c values do to the graph ?

Increasing a or c will increase the value of the function, for all x. But increasing b will increase the value of the function for positive x, but decrease it for negative x. Figure out for yourself, why this is true.

If C was 0 will the graph always be symmetrical about the origin or is this my misunderstanding ?

It is a misunderstanding. But if b=0, the graph will be symmetrical. Here's you you figure it out : y(x) = ax^2 + bx + c. What is y(x) if b=0 ? Now what is y(-x), with b=0 ? Compare these.
 
Actually
if you take f(x)=ax^2 + bx + c as equation of parabola and then investigate it will be much eaqsier.
if a>0 the parabola open's upward and if a < 0 parabloa opens downward.
now if c=0 then above reduces to
y =ax(x+b)
which means vertex of parabola shifts to a position whose x coordinate -is -b (ii suppose not sure about this)
if d=0
the b^2=4ac the parabola touches x-axis and point where it touches x-axis is only solution of equation.
similarly you can find other cases


:smile:
 
Do you have access to Excel or some other spread sheet? The best way to learn what those constants do is draw some pictures. You easily do this in excel, with little effort you could change a parameter and immediately see the graph change.
 
Can you help me draw graph of quadratic functions in excel ?
 
It may be good to consider a physical analogy... namely a particle undergoing constant acceleration: x=At2+Bt+C,
where A=a/2 "half of the acceleration",
B=v0 "initial velocity",
and C=x0 "initial position".

C is the intercept on the vertical axis.
Increasing C, translates the parabola upward.
B is the slope of the tangent at the intercept.
Varying B can be pictured this way: while maintaining the intercept, translate the parabola, which effectively varies the slope of the tangent at the intercept.
Varying A changes the "curvature" in some sense.
 
An EQUATION, such as ax2+ bx+ c= 0 does NOT have a "graph". If you meant the graph of the function y= ax2+ bx+ c, that'ws a whole different matter.
 

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