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How do you prove something is tangetnt to something else? (1 Viewer)
- Thread starter pomsky
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pomsky
Active Member
Also in Q 8a.)
http://imgur.com/2lqcSbP
But the answer quotes the formula P = Ae^(kt)
http://imgur.com/b4B0CHO
Are you allowed to do that? And if you're not, how do you get rid of the C when integrating?
 )
Then stuck. lol
http://imgur.com/2lqcSbP
But the answer quotes the formula P = Ae^(kt)
http://imgur.com/b4B0CHO
Are you allowed to do that? And if you're not, how do you get rid of the C when integrating?
pomsky
Active Member
And in Q8b.) (lols soz for all the qs guys.)
Question: http://imgur.com/tqKRSCe
Answers: http://imgur.com/Q86nRgC
I get that for f(x) to be increasing, f'(x) >0, but why did they jump to the discriminant being less than 0? How do they know it's not a concave down curve?
TY
Also how do I make these images actually images (to save people from clicking around) ? ahaha
Question: http://imgur.com/tqKRSCe
Answers: http://imgur.com/Q86nRgC
I get that for f(x) to be increasing, f'(x) >0, but why did they jump to the discriminant being less than 0? How do they know it's not a concave down curve?
TY
Also how do I make these images actually images (to save people from clicking around) ? ahaha
pomsky
Active Member
These are all from the 2010 BOSTES paper, btw.
pomsky
Active Member
LOL
there's one more : How do you find max value of f(x) in Q9 bii? I know how to read the graph for x values, but not exactly sure how to for y values. The f(0)= 0 is probably there to help with the integration constant but there's no equation so I'm a bit stuck.
Q:
http://imgur.com/z0iYTel
Ans: f(x) = 4
there's one more : How do you find max value of f(x) in Q9 bii? I know how to read the graph for x values, but not exactly sure how to for y values. The f(0)= 0 is probably there to help with the integration constant but there's no equation so I'm a bit stuck.
Q:
http://imgur.com/z0iYTel
Ans: f(x) = 4
There are two ways to prove that it is increasing for a certain value:And in Q8b.) (lols soz for all the qs guys.)
Question: http://imgur.com/tqKRSCe
Answers: http://imgur.com/Q86nRgC
I get that for f(x) to be increasing, f'(x) >0, but why did they jump to the discriminant being less than 0? How do they know it's not a concave down curve?
TY
1) Use the first derivative method
2) Prove that it is a positive definite (i.e. The discriminant is zero but the coefficient of x^2 is positive - It will look like a concave up parabola above the x-axis with no roots)
vitamin D
Active Member
so (triangle)>0 ?
It will have no roots so triangle/discriminant < 0
Have a look at this:
https://www.google.com.au/search?q=...sSExMLQyAIVxJCUCh3ZBwBN#imgrc=IC8t-EQ5DvhGFM:
for the tangent question you just equate the two equations to make x^2-4x+4=0. you then show that the discriminant is equal to 0 which means that there is only one root and therefor one point of intersection which means that the line is a tangent to the curve.
vitamin D
Active Member
i always assumed (triangle)>0 was 2 solutions, (triangle)<0 was no solutions and (triangle)=0 was one solution
pomsky
Active Member
What you assume is correct. It's also what Crisium is saying.
And gosh AHAHAHAHA forgot about the coefficient there. fanks
pomsky
Active Member
Which two equations? For some reason I got BT : y = 2x and when that equates with parabola, discriminant =4.
But good methodology TY TY TY
pomsky
Active Member
bump for all the other Qs
for question 8a it is like the questions when they say prove dP/dt = kP, you just work backwards to find the original equation and then do the question from there
for question 8b for get the first derivative and then you use quadratic equation to find the roots(or the discriminant which is the important part). if the curve has a discriminant greater than zero it means that there are 2 roots(x-intercepts) which we don't want because that means that at some values of x the curve is below the x axis which means it is decreasing at those points(as this is the 1st derivative). therefor we need the discriminant to be less than zero so that there are no intercepts which means that the graph is always above the x-axis and that it is always increasing.
for question 8b for get the first derivative and then you use quadratic equation to find the roots(or the discriminant which is the important part). if the curve has a discriminant greater than zero it means that there are 2 roots(x-intercepts) which we don't want because that means that at some values of x the curve is below the x axis which means it is decreasing at those points(as this is the 1st derivative). therefor we need the discriminant to be less than zero so that there are no intercepts which means that the graph is always above the x-axis and that it is always increasing.
Last edited:
Which two equations? For some reason I got BT : y = 2x and when that equates with parabola, discriminant =4.
But good methodology TY TY TY
your 2 lines should be y=x^2(the curve) and y=4x-4(the line you just found)
Also in Q 8a.)
http://imgur.com/2lqcSbP
But the answer quotes the formula P = Ae^(kt)
http://imgur.com/b4B0CHO
Are you allowed to do that? And if you're not, how do you get rid of the C when integrating?
pomsky
Active Member
Does anyone know about this q here?
keepLooking
Active Member
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You know the area of the the derivative graph is the total distance traveled. It is 4 because that is the largest (positive) area ?Does anyone know about this q here?
pomsky
Active Member
Woop, now I do. TY x)