Are you ready to take your first step toward achieving your goal?
- Ten diagnosis quiz questions
- Ten minutes in duration
- Required to attempt all questions
- A mixture of short-answer and multiple-choice questions
- Instant feedback straight after the quiz
OK, let’s get started now!
0 of 10 Questions completed
Questions:
Information
You have already completed the quiz before. Hence you can not start it again.
You must sign in or sign up to start the quiz.
You must first complete the following:
Quiz complete. Results are being recorded.
0 of 10 Questions answered correctly
Your time:
Time has elapsed
You have reached 0 of 0 point(s), (0)
Earned Point(s): 0 of 0, (0)
0 Essay(s) Pending (Possible Point(s): 0)
The result is not promising.
You will need to push yourself a bit further.
You are almost getting there.
Stay focused to obtain better results!
Excellent!
We are so impressed with your result!
Fantastic Result!
We hope you’ll keep continued this serial of good marks.
- Current
- Review
- Answered
- Correct
- Incorrect
Question 1 of 10
Find the total surface of the prism, leaving in \({{\rm{m}}^2}\).
Question 2 of 10
Find the area of the sector, correcting to two significant figures.
\(\text{Area of a sector } = \pi {r^2} \times \dfrac{\theta }{{360^\circ }}\)
Question 3 of 10
Find \(\theta \), correcting to the nearest degree, if the area of the triangle is 24 cm2.
\(Area = \dfrac{1}{2}ab\sin C\)
Question 4 of 10
Find \(\theta \), correcting to the nearest degree.
\(\dfrac{a}{{\sin A}} = \dfrac{b}{{\sin B}} = \dfrac{c}{{\sin C}}\)
Question 5 of 10
Find \(x\) and \(y\), correcting to one decimal place.
\(\dfrac{a}{{\sin A}} = \dfrac{b}{{\sin C}} = \dfrac{c}{{\sin C}}\)
Question 6 of 10
Find the smallest angle in the triangle, correcting to the nearest minute.
\(\cos A = \dfrac{{{b^2} + {c^2} – {a^2}}}{{2bc}}\)
Question 7 of 10
Find \(x\), correcting to one decimal place.
\(\cos A = \dfrac{{{b^2} + {c^2} – {a^2}}}{{2bc}}\)
Question 8 of 10
Find the total surface of the prism, leaving in \({\rm{c}}{{\rm{m}}^2}\).
Question 9 of 10
Find the area of the sector, correcting to two significant figures.
\(\text{Area of a sector } = \pi {r^2} \times \dfrac{\theta }{{360^\circ }}\)
Question 10 of 10
Find the largest angle in the triangle, correcting to the nearest minute.
\(\cos A = \dfrac{{{b^2} + {c^2} – {a^2}}}{{2bc}}\)
