[CIE] All Pure Mathematics (P1, P2 and P3) doubts here !

[TJ-56]

This may be of help.
I did it in a few minutes, so excuse of sloppiness 
Tell me if anythings wrong too, even though I made sure of them.

[Arthur Bon Zavi]

I am a average student so . I will do everything properly so i wont make mistakes in my exam :/ .

And Sky.Dude i learned alot from you
Thanks

And ace the exams guys  

Don't go on his words. This man can take the crap out of mathematics. God of mathematics.

[yasser37]

can anyone help me in Argand diagrams?
for example the one in november 09, question 7 part iv
and other example of how to draw them if possible

please help
thanks

[yasser37]

also
http://www.xtremepapers.me/CIE/International%20A%20And%20AS%20Level/9709%20-%20Mathematics/9709_w03_qp_3.pdf

(iv) Using your diagram, calculate the least value of || for points on this locus. [2]
I know that it's done in a previous post but I didn't understand it

and november 06
question 9 part 4

please someone explain
thanks

[SkyPilotage]

also
http://www.xtremepapers.me/CIE/International%20A%20And%20AS%20Level/9709%20-%20Mathematics/9709_w03_qp_3.pdf

(iv) Using your diagram, calculate the least value of || for points on this locus. [2]
I know that it's done in a previous post but I didn't understand it

and november 06
question 9 part 4

please someone explain
thanks

ThE least value for modulus of z means find the shortest distance of a line for the origin from the circle....Then you use ur gragh to calculate it...

[THEIGBOY]

can some one solve october 2010 question 10, and explain it please ,
thanks

[Reekx]

im not perfect in loci of complex numbers, someone please summarize/help thanks

[yasser37]

can anyone help me in Argand diagrams?
for example the one in november 09, question 7 part iv
and other example of how to draw them if possible

please help
thanks

and november 06
question 9 part 4

please someone explain
thanks

can someone help please

[cs]

Hi, can anyone explain to me how do you do, November 2002 P3 9709

Q5iii

and

8iii

Thank you

[Shoshou..Mony]

@cs :

5)iii) -5 < 4sinx - 3cox < 5

1/4sinx-3cosx+6 has greatest value = 1/(-5+6)

i.e equal 1

8)b)iii) (OA/OB) = OC

[cs]

@cs :

5)iii) -5 < 4sinx - 3cox < 5

1/4sinx-3cosx+6 has greatest value = 1/(-5+6)

i.e equal 1

8)b)iii) (OA/OB) = OC

Thank you so much for your help

+REP

[Shoshou..Mony]

Thank you so much for your help

+REP

If you have any more doubts then post before I forget my P3 syllabus.

Thanks for the +rep. =]

[Arissa_04]

Hi
Could someone please explain how to do June 2010 Paper 3 variant 1-Question 4 ii)
and also Paper 3 June 2009 Question 10(the whole question).

Thanks in advance.

[dlehddud]

4 ii) 2010

As we know that sin 3x sin x= 0.5 (cos 2x- cos 4x) from the previous part of the question, we can substitute this into our given integral:

  integral sign (0.5 cos 2x- 0.5 cos 4x)
 
if we integrate this, we get

(sin2x)/4 - (sin4x)/8

substituting limits, we get

((sin (2pi/3))/4 - (sin(4pi/3))/8)  -  ((sin (2pi/6))/4 - (sin(4pi/6))/8)

=> (sqrt 3)/8 - (-(sqrt3)/16) - (sqrt 3)/8 - (-(sqrt 3)/16)
=> 2(sqrt 3)/16
=>(sqrt 3)/8

question 10 2009

i) To find x at M, we must find the maximum of the curve, which is simply the derivative of the curve equated to zero.

y=x^2*(sqrt(1-x^2))

we find the derivative by using the product rule,

dy/dx= 2x*(sqrt(1-x^2))+0.5*(-2x)/(sqrt(1-x^2))*x^2
        = 2x(sqrt(1-x^2)) - x^3/(sqrt(1-x^2))

dy/dx=0

2x(1-x^2)/(sqrt(1-x^2)) - x^3/(sqrt(1-x^2))=0 ......... i've equated the denominators if u were unsure

(2x- 3x^3)/(sqrt(1-x^2))=0

Now we only require the numerator to be zero. Therefore,

2x-3x^3=0
x(2-3x^2)=0

Hence, x=0 and 2-3x^2=0
                   => 3x^2=2
                   => x^2=2/3
                   => x= sqrt(2/3)

therefore, the x coordinate of M is sqrt(2/3). It cannot be 0, as M is obviously not centered at x=0


ii)As we are integrating by substituting, we must also change the variables around a bit:

x=sin(theta)
dx/d(theta)=cos(theta)
dx=cos(theta) d(theta)

To do this, we merely substitute in sin (theta) and the new variables to replace dx into the equation given:

Area=integral sign   sin^2(theta)*sqrt(1-sin^2(theta))*cos(theta)  d(theta)

Area=integral sign   sin^2(theta)*sqrt(cos^2(theta))*cos(theta)  d(theta)

Area=integral sign   sin^2(theta)*cos(theta)*cos(theta) d(theta)

Area=integral sign   0.25*(sin2x)^2  d(theta)


the limits are given by substituting into the equation x=sin(theta)
we are finding theta, so we use   theta=sin^-1  x

iii)Do not think that because they give you an equation, that you can use it straight away. We cannot integrate most trigonometric integrals if they are squared, such as this. So we convert it to a form we CAN integrate, namely, a cos4x form:

0.25*(sin^2(2theta))

cos(4theta)= 1-2*(sin^2(2theta))


thus,

2*(sin^2(2theta))=1-cos(4theta)

and so

0.25*(sin^2(2theta))=(1-cos(4theta))/8

Hence we are integrating this, NOT 0.25*(sin^2(2theta))


(1-cos(4theta))/8= 1/8 - (cos(4theta))/8

So, we integrate this:


Area= integral sign  1/8 - cos(4theta))/8  d(theta)

Area= 1/8*(theta) - (sin(4theta))/32       with limits pi/2 and 0


Area= 1/8*(pi/2) - (sin(2pi))/32 - 1/8*(0) + (sin(0))/32

Area=pi/16



Hope this wasn't too confusing =P
It is however up to the standard of working you require at CIE A-level so it shouldn't be tooo hard
Ask any questions if you don't get certain parts of it!

[TBT]

I dont knw how to go about question 5 for maths p1 June 2006... can anyone help?? its part of my homework... thanks!!