3.1 Unit 3 Question 1 How do you prove that three 3-D points, A, B and C, are collinear ?

3.1

Unit 3 Question 1

•How do you prove that three 3-D points, A, B and C, are collinear ?

Answer to Unit 3 Question 1

• Prove that vector AB is a multiple of vector BC

AB = k BC• And state that B is common to both vectors

• Prove that vector AB is a multiple of vector BC

AB = k BC• And state that B is common to both vectors

3.1

Unit 3 Question 2

•How do you add or subtract vectors ?


• add or subtract matching components

• add or subtract matching components

3.3

Unit 3 Question 3

•State the three rules of logs ?


• (i) logaxy = logax + logay

• (ii) loga = logax – logay

• (iii) logaxn = nlogax

• (i) logaxy = logax + logay

• (ii) loga = logax – logay

• (iii) logaxn = nlogax

xy

3.4

Unit 3 Question 4

•What does ksin(x-a) expand out to?


• ksinxcosa-kcosxsina

3.1

Unit 3 Question 5

•If u =

then what is u ?

abc


• work out length

√(a2+b2+c2)

• work out length

√(a2+b2+c2)

3.1

Unit 3 Question 6

•What does•a.a equal ?


• a ²

3.3

Unit 3 Question 7

•Express the equation y=kxn in the form of the equation of a straight line, Y=nX+c.


• logy = nlogx + logk• logy = nlogx + logk

3.1

Unit 3 Question 8

•How do you show that two vectors are perpendicular ?


•Show that a.b=0

a

b

3.2

Unit 3 Question 9

•What do you get when you differentiate cosx ?


• -sinx

3.3

Unit 3 Question 10

•What is

•logax – logay

equal to ?


• x

loglogaa yy

3.1

Unit 3 Question 11

•How do you name the angle between a line and a plane ?


• (i) start at end of line (A)• (ii) go to where line meets

the plane (B)• (iii) go to the point

on the plane directly under the start of the line (C)

• (iv) Answer is ABC

A

B

C

3.1

Unit 3 Question 12

•What is a position vector ?


•A vector which starts at the origin

3.2

Unit 3 Question 13

•What do you get when you differentiate sin x ?


•cos x•cos x

3.2

Unit 3 Question 14

•How do you integrate cos ax ?


• 1/a sin ax + C

3.2

Unit 3 Question 15

•What do you get when you differentiate

•cosax ?


•-asinax

3.2

Unit 3 Question 16

•How would you differentiate a function like

y = sin ax ?


• dy/dx = acos ax• dy/dx = acos ax

3.3 and 1.2

Unit 3 Question 17

•What is logaa

equal to ?


•1

3.3 and 1.2

Unit 3 Question 18

•What is loga1

equal to ?


•0

3.4

Unit 3 Question 19

•How do you express acosx+bsinx+cin the formkcos(x- α)?


• (i) expand brackets and equate like terms

• (ii) find k =√(a2+b2)• (iii) identify quadrant α is in• (iv) find α using tanα = sinα

cosα

ATS

C

3.4

Unit 3 Question 20

•How do you solve an equation of the form acosx + bsinx + c=0 ?


•Change acosx+bsinx into Rcos(x- )

•rearrange and solve

•Change acosx+bsinx into Rcos(x- )

•rearrange and solve

3.1 Unit 3 Question 1 How do you prove that three 3-D points, A, B and C, are collinear ?

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