Y9 Math Jeopardy Jeopardy Template

Financial maths

Linear algebra

Linear relationships

Pythagoras' theorem and trigonometry

Algebraic techniques

100

Emma earns $18 per hour.

She works 6 hours on Saturday.

How much does she earn?

18×6 = $108

100

Simplify:

3x+7x−2x

100

What is the Y-value for x-intercepts for any graphs?

Y=0

100

A right-angled triangle has two right angle side lengths:

6 cm
8 cm

Find the value of the hypotenuse.

c²=6² + 8²

c=10 cm (reject negative solution)

100

Expand and simplify:

(x+4)(x+3)

x²+3x+4x+12

200

A student deposits $2000 into a bank account earning 4% simple interest per year.

How much interest is earned after 3 years?

I=Prt

I=2000×0.04×3

I=$240

200

Simplify:

8ab²−9ab−ab²+3ba

7ab²- 6ab

200

A line has gradient 4 and passes through the point (0,−3).

Find its equation.

y=mx+c

m=4

c=-3

y=4x-3

200

A right-angled triangle has:

Hypotenuse = 13 cm
One shorter side = 5 cm

Find the other shorter side.

x²+5²=13²

we can solve and get x=12

200

Fully Factorise: x²+11x+24

(x+3)(x+8)

300

A student invests $1000 at 5% compound interest per year.

What is the value of the investment after 2 years?

Compound interest formula:

A=P(1+r)ⁿ

A=1000(1.05)²

A= 1102.50

300

Solve:

2(x+3)−4x=8

2x+6−4x=8

−2x+6=8

−2x=2

x=−1

300

Rearrange 4x + 2y = 20 into the form y=mx + c

y=-2x+10

300

A right-angled triangle has:

Opposite side = 12 cm
Hypotenuse = 13 cm

Find sinθ

sinθ = 12/13

300

Expand: (x+4)(x−4) into x² - a² where a is a natural number.

x²-16

400

Two banks offer the following savings accounts:

Bank A offer 6% simple interest.

Bank B offer 5% compound interest.

A student invests $5000 for 4 years.

Which bank gives the higher final balance?

Bank A:

I=5000(0.06)(4)

I=1200

Final balance:$6200

Bank B:

A=5000(1.05)4

A≈6077.53

Bank A have higher balance after 4 years.

400

A number is multiplied by 7 and then divided by 3.

The final result is 8.

What is the number?

Let the number be x.

7x/3=8

7x=24

x=24/7

400

Find the coordinates for the y-intercept of 6x + 3y = 30

Let x=0

3y=30

y=10

Therefore, the coordinates for y-intercepts is (0,10)

400

A ladder 10 m long leans against a wall.

The base of the ladder is 6 m from the wall.

How high up the wall does the ladder reach?

h²+6²=10²

h=8 m

400

A quadratic expression can be factorised as

(x+a)(x+b)

where a and b are positive integers. The expanded form is x²+15x+56

Determine the values of a and b.

a+b=15

a*b=56

Therefore a=7 and b=8.

500

A mobile phone plan costs:

$20 monthly fee
$0.10 per text message

A student's bill for one month is $47.

How many text messages were sent?

20+0.10x=47

0.10x=27

x=270

500

The perimeter of a rectangle is 30 cm.

Its length is x+2 and its width is x−1.

Find the value of x.

Perimeter formula: 2L+2W=30

Substitute: 2(x+2)+2(x−1)=30

Expand: 2x+4+2x−2=30

Solve: x=7

500

Find the equation of a line that passes through (0, 8) and (2, 10)

Gradient intercepts form: y=mx+c

c=8 since the y intercepts is (0,8)

m=rise/run=(10−8)/(2-0)=2/2=1

y=x+8

500

A right-angled isosceles triangle has a hypotenuse of length 10 cm.

Find the exact length of each shorter side.

Let each shorter side be x.

x²+x²=10²

x=5*sqrt(2)

500

The expression (x+3)(x+k) expands to x²+10x+21.

Find the value of k.

Expand:

(x+3)(x+k)=x²+(k+3)x+3k

Compare coefficients:

k+3=10 which gives us k=7

3k=21 which gives us k=7 as well.

Therefore k=7.