YEAR 10 MATHEMATICS EXAMINATION - Kinross College...Section 1: Multiple choice ( Total 25 marks, one...
Transcript of YEAR 10 MATHEMATICS EXAMINATION - Kinross College...Section 1: Multiple choice ( Total 25 marks, one...
YEAR 10 MATHEMATICS EXAMINATION
SEMESTER 1 2016
QUESTION AND ANSWER BOOKLET
STUDENT NAME:
TEACHER:
DATE:
TIME ALLOWED FOR THIS PAPER Reading time before commencing work: 10 minutes Working time for this paper: 105 minutes MATERIAL TO BE PROVIDED BY THE SUPERVISOR β’ This Question/Answer Booklet
MATERIAL TO BE PROVIDED BY THE CANDIDATE β’ Pen/pencil for answering questions β’ Erasing stationery β’ Up to two scientific calculators β’ Written notes on one unfolded A4 sized paper;
can be double-sided
TOTAL QUESTIONS: 45 TOTAL MARKS: 125 Section 1: Multiple choice
25 marks
Attempt questions 1 - 25
Section 2: Written answer
100 marks
Attempt questions 1 - 20
AT THE END OF THE EXAMINATION Attach any extra sheets used to this Question/Answer booklet.
IMPORTANT NOTE TO CANDIDATES No other items may be taken into the examination room. It is your responsibility to ensure that you do not have any unauthorised notes or other items of a non-personal nature in the examination room. If you have any unauthorised material with you, hand it to the supervisor BEFORE reading any further.
Kinross College Year 10 Mathematics Exam, Semester 1 2016 1
Kinross College Year 10 Mathematics Exam, Semester 1 2016 2
Section 1: Multiple choice (Total 25 marks, one mark per question)
1. The simplified form of 7ππ + 2π β 5ππ + π is:
a) 2ππ + 2π2
b) 2ππ + 3π
c) 2ππ + π
d) 5ππ
2. The expanded form of 2π₯(3π₯ β 5) is:
a) 6π₯2 β 5
b) 6π₯ β 10
c) 6π₯2 β 10π₯
d) 5π₯2 β 10
3. The fully factorised form of 8π₯π¦ β 24π¦ is:
a) 4π¦(2π₯ β 6π¦)
b) 8(π₯π¦ β 3π¦)
c) 8π¦(π₯ β 24)
d) 8π¦(π₯ β 3)
4. 3π₯3π¦ Γ 2π₯5π¦3 is equal to:
a) 5π₯15π¦3
b) 6π₯15π¦3
c) 6π₯8π¦4
d) 5π₯8π¦4
Kinross College Year 10 Mathematics Exam, Semester 1 2016 3
5. 12π7 Γ· 4π4 simplifies to:
a) 3π3
b) 3π11
c) 8π3
d) 8
π3
6. Which of the following statements is true for the given diagram?
a) y2 β w2 = x2
b) x2 β w2 = y2
c) y2 β x2 = w2
d) w2 β x2 = y2
7. The value of x in the triangle shown is:
a) 1
b) 11
c) 10
d) 5
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8. For the shape shown to be a rectangle, the length of the diagonal must be:
a) 15 m
b) 8 m
c) 17 m
d) 23 m
9. If , then
a)
b)
c)
d)
10. Which side is adjacent to ΞΈ in this triangle?
a) AB
b) AC
c) BC
d) Opposite
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11. If 9 is subtracted from x and the result is 14, then the value of x is:
a) x = 3
b) x = 5
c) x = 23
d) x = 25
12. The solution to the equation 2x + 5 = 17 is:
a) x = 6
b) x = 3
c) x = 4
d) x = 11
13. The solution to the equation 5x β 12 = 6 β x is:
a) x = 3
b) x = 1
c) x = β3
d) x = β1
14. Solve the following inequality 2π < 8:
a) π > 5
b) π β₯ 7
c) π < 4
d) π β₯ 2
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15. Which number line shows x + 4 < 6?
a)
b)
c)
d)
16. The solution to the equation :
π₯β9
5= 5
a) x = 24
b) x = 34
c) x = 25
d) x = 16
17. Expand and simplify (m β 4)(m +4):
a) π2 + 4π β 8
b) π2 + 4π β 8
c) π2 + 4π β 8
d) π2 β 16
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18. Factorise the following by finding the highest common factor:
35ab2 + 21ab
a) 14ab(2b + 1)
b) 7ab(5b + 3)
c) 35ab(7a + 3b)
d) 35ab2
19. Expand and simplify (x + 4)2
a) π₯2 + 8π₯ + 16
b) π₯2 + 4π₯ + 8
c) π₯2 + 2π₯ + 4
d) π₯2 + 16
20. When the expression is simplified, it becomes:
a)
b)
c)
d)
21. Simplify the following using the fifth index laws.
a) π3
8
b) π3
c) π2
d) π2
3
Kinross College Year 10 Mathematics Exam, Semester 1 2016 8
Questions 22 and 23 relate to the following right-angled triangle:
22. The value of cos ΞΈ in the diagram above is:
a)
b)
c)
d)
23. The value of ΞΈ in the diagram above is:
a) 23Β°
b) 67Β°
c) 27Β°
d) 43Β°
24. 2 3 23 5p q pqΓ simplifies to:
a) 8π3π
b) 15π3π5
c) 5ππ2
d) 35π2π3
Kinross College Year 10 Mathematics Exam, Semester 1 2016 9
25.
3π₯2π¦4 Γ 5π₯π¦7
12π₯3π¦5
Simplify the following using index laws. Express your answer with positive indices.
a) 8π₯π¦3
12
b) 15π¦3
4
c) 5π¦6
4
d) π₯π¦13
12
Kinross College Year 10 Mathematics Exam, Semester 1 2016 10
Section 2: Written answer (Total 100 marks)
1. Use words from the list below to complete the following sentences.
Term Expression Coefficient Constant Term Equation Hypotenuse
a) A _____________ is a group of numbers and pronumerals, connected by multiplication and division.
b) The ____________ is a numeral placed before pronumeral is multiplied by that factor.
c) A _____________ is a number with no attached pronumerals.
d) An ____________ is a group of mathematical terms containing no equals sign.
4 Marks
2. Write the following in index form:
a) 3 Γ 3 Γ 3 Γ 3 Γ 3
b) π Γ π Γ π
c) 5 Γ π Γ π Γ π Γ π
3 Marks
3. Which side (AB, AC or BC) of these triangles is: (Label)
I - the hypotenuse ΞΈ? II - the opposite to ΞΈ? III β the adjacent to ΞΈ?
a)
b)
3 Marks
3 Marks
Kinross College Year 10 Mathematics Exam, Semester 1 2016 11
4. Simplify the following algebraic expressions:
a) β2ππ Γ 4ππ b) 6ππ2 Γ· 2ππ
c) π₯0 + 40 d) (π₯2)5 Γ (π₯2)3
8 Marks
5. Expand the following algebraic expressions and simplify where appropriate:
a) 3(2π₯ β 7)
2 Marks
b) 2(3π₯ + 3) + 4(π₯ + 5)
2 Marks
c) (π + 2)(π + 5)
2 Marks
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6. Solve the following equations: 6 Marks
a) π₯ + 5 = 20
b) 2π₯ + 7 = 15
c) 4(π₯ + 3) = 20
7. Factorise the following by finding the highest common factor: 4 Marks
a) 5π‘ + 30
b) 4π2 β 20ππ
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8. Simplify each of the following expressions below. Leave your answers in index form.
4 Marks
a) β9 Γ· β4
b) 9π₯8π¦7
3π₯π¦3
9. Simplify the following using the index laws, and express using positive indices only.
a) π3
π2 Γ π5
π2
b) 2π₯8π¦7
3π2 Γ 6π₯3π¦3
2π2
4 Marks
10. Find the value of these expressions if x = 4, y = β5 and z = 2.
a)
b)
4 Marks
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11. Solve each of the following equations:
a) 4π₯ + 3 = 15 b) 8π₯ β 15 = 5π₯ + 6 c) 6(π₯ + 3) = 21 d)
5π₯β36
= 7
6 Marks
12. Solve each of the following inequalities and then show each solution on a number line.
a) 2π + 7 β₯ 8 b) 5 β π₯ > 3
6 Marks
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13. For each of the following statements, write an equation or inequaltiy and solve for the pronumeral.
a) If x is added to 12, the result is 8.
b) If x is divided by 3 then 2 is added, the result is 8.
c) If a number, x, is multiplied by 3, the result is less than 9
2 Marks
2 Marks
2 Marks
14. Determine the value of x in these triangles using Pythagoarsβ theorem. Answer correct to two decimal places.
a)
2 Marks
b)
2 Marks
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15.
For the following right-angled triangle, write down the following ratios.
a) sin ΞΈ = _____________ b) cos ΞΈ c) tan ΞΈ
= ______________ = ______________
6 Marks
Kinross College Year 10 Mathematics Exam, Semester 1 2016 17
16.
17.
18.
Factorise the following:
a) b) 23 27x xβ β
Expand and simplify the following:
a) b)
Find the value of the unknown length in these triangles. Round to two decimal places.
a)
b)
4 Marks
4 Marks
6 Marks
Kinross College Year 10 Mathematics Exam, Semester 1 2016 18
19
20
Find ΞΈ in the following triangles, correct to the nearest degree where necessary.
a)
b)
A city council wants to build a skateboard ramp 4 m long and 2.4 m high. How long should the base of the ramp be?
6 Marks
3 Marks
Kinross College Year 10 Mathematics Exam, Semester 1 2016 19
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