3Tvwo §6.4 / 3Thavo §6.5 Calculating in right-angled triangles.

§6.4 / §6.5 Calculating in right-angled triangles

Choose the right Formula-in-letters, that tells you how to calculate the

SINE, COSINE and TANGENT, in the next slide.

1 / 21

Slide 1: Tekstslide

WiskundeMiddelbare schoolhavo, vwoLeerjaar 3

In deze les zitten 21 slides, met interactieve quizzen en tekstslides.

Lesduur is: 50 min

Onderdelen in deze les

§6.4 / §6.5 Calculating in right-angled triangles

Choose the right Formula-in-letters, that tells you how to calculate the

SINE, COSINE and TANGENT, in the next slide.

Slide 1 - Tekstslide

vwo §6.4 / havo §6.5

Calculating in right-angled triangles

Because it's been a while since you worked on this Chapter -holiday!- we will look back shortly on the

content you learned up to now!

VWO classes: STUDY SQUARERS, feel free to go to the STUDY SQUARE, doing § 6.4 on your own.

Slide 2 - Tekstslide

The correct letterformula is:

SAH COA TAH

SIN COS TOA

COH TAH SIN

SOH CAH TOA

Slide 3 - Quizvraag

Answer: SOH CAH TOA

meaning:

Sine = Opposite shorter side / Hypotenuse

Cosine = Adjacent shorter side / Hypotenuse

Tangent = Opposite shorter side / Adjacent shorter side

Slide 4 - Tekstslide

Slide 5 - Tekstslide

§6.4/§6.5 Calculating in right-angled triangles

You now know the:

+ sine, cosine and tangent

+ but when do you use which of these?

+ that is shown in the next slides!

+ FIRST WE DO 21 TOGETHER!

Slide 6 - Tekstslide

Slide 7 - Tekstslide

Slide 8 - Tekstslide

Slide 9 - Tekstslide

Homework time.

+ Do §6.4 vwo / §6.5 havo Calculating in right-angled triangles

+ Later a new technique will be explained, that you need to do the last 3 exercises!

Slide 10 - Tekstslide

Explanation for the last 3 exercises of the paragraph.

Slide 11 - Tekstslide

If you want to calculate length PQ,

then what is the problem?

Key in your answer in the next slide!

Slide 12 - Tekstslide

What's the pro, bro (sis)?
So: describe the problem!

Slide 13 - Woordweb

Answer:

The big problem is:

there is no right angle to be seen?!

Pythagoras only works in right-angled triangles!

The method to solve this problem is shown in the next slide.

Slide 14 - Tekstslide

Slide 15 - Tekstslide

Slide 16 - Tekstslide

Now there are even two right-angled triangles!

REMEMBER: WE ARE AFTER: length PQ!!

1. draw auxiliary line (=helplijn) RS.

2. calculate RS with sine angle P

3. calculate PS with cosine angle P (or tangent angle P)

4. calculate QS with tangent angle Q

5. add PS to QS to get length PQ

Slide 17 - Tekstslide

helping line = auxiliary line

Slide 18 - Tekstslide

Homework time again.

In the next slide an Oldie-but-Goldie...

Slide 19 - Tekstslide

Slide 20 - Tekstslide

Slide 21 - Tekstslide