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point of inflexion (1 Viewer)
- Thread starter Arithela
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Re: 回复: Re: point of inflexion
In the Mathematics HSC Exam.. if you are asked to "Find any points of inflexion" for 1 mark... would you also have to test the point or prove its a pt of inflexion, to gain the 1 mark?
In the Mathematics HSC Exam.. if you are asked to "Find any points of inflexion" for 1 mark... would you also have to test the point or prove its a pt of inflexion, to gain the 1 mark?
Timothy.Siu
Prophet 9
Re: 回复: Re: point of inflexion
well, maybe not but how will u know if it is or not? i'm not willing to take a 50% chance for 1 mark (u know wat i mean)
yesdanz90 said:
well, maybe not but how will u know if it is or not? i'm not willing to take a 50% chance for 1 mark (u know wat i mean)
Re: 回复: Re: point of inflexion
In answers for HSC exams I have they always test. It only takes 5 seconds and you could easily just test one side for the concavity then fill the rest in as you know what it will be.danz90 said:
Graceofgod
Member
Re: 回复: Re: point of inflexion
I think I must have missed some sarcasm or misunderstood your question...tommykins said:
tommykins
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回复: Re: 回复: Re: point of inflexion
What about 4.3? 3.4? 3.2? 4.5678685453 ?
You have to solve the equation for f''[x], you can't simply assume that at x = 4, there is an inflection point.
You're saying since f''[5] < 0 and f''[3] > 0, then f''[4] = 0 which is not true.Graceofgod said:
What about 4.3? 3.4? 3.2? 4.5678685453 ?
You have to solve the equation for f''[x], you can't simply assume that at x = 4, there is an inflection point.
I don't know if this is still your question or not - the thread is 4 pages long now. but i can't be bothered reading all 4 pages of gossip so i'm just gonna answer this question.Arithela said:
Definition of Differentiating a function of any kind. Finding the first derivative gives the equation of the "tangent" to the graph - which you sub in particular x and y values to find that particular tangent to each graph.
so a point of inflexion is where the derivative is equal to zero and concavity changes.
ie: F'(X) = 0 or y'=0 (just a stationary point basically)
a horizontal point of inflexion is where the tangent is flat
so when you find the 2nd derivative or F"(X), they = 0
and listen to tommykins = that guy is a brain and a half.
Graceofgod
Member
Re: 回复: Re: 回复: Re: point of inflexion
We are talking about proving that it is a point of inflexion.
If you find that f"(4) = 0, then check f"(3) and f"(5), you can see if it is actually a point of inflexion.
My question was whether or not you could get away with just saying
f"(3) > 0 and f"(5) < 0 without showing working.
Ah good, so it was you who missed what I meant.tommykins said:
We are talking about proving that it is a point of inflexion.
If you find that f"(4) = 0, then check f"(3) and f"(5), you can see if it is actually a point of inflexion.
My question was whether or not you could get away with just saying
f"(3) > 0 and f"(5) < 0 without showing working.
tommykins
i am number -e^i*pi
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回复: Re: 回复: Re: 回复: Re: point of inflexion
sorry for the misunderstanding.
if that's the case, then yes, you can state f''[3] < 0 and f''[5] > 0 .'. at x = 4 point of inflection as concavity changes.Graceofgod said:
sorry for the misunderstanding.
Graceofgod
Member
Re: 回复: Re: 回复: Re: 回复: Re: point of inflexion
I got my answer in the end. Thanks.
Its cooltommykins said:
I got my answer in the end. Thanks.