Asian Science and Maths Olympiad (ASMO) is a competition platform designed to challenge and evaluate student’s knowledge in Mathematics and Science at their grade level. The questions in the Olympiad will stretch their knowledge and understanding of the concepts. Our syllabus fits nicely into the syllabus that concentrates on non-routine problem-solution to prepare the students for the competition. With the expansion of STEM education worldwide, ASMO certainly answers the need of it. Students will be well prepared with the skills to meet the science and technology challenges.
In Malaysia, ASMO is officially endorsed by Ministry of Education and all participants will obtain curriculum marks. In 2018 alone, Asian Science and Mathematics Olympiad has received 70,000 entries from across the ASEAN countries. We are targeting for the number to increase at 80,000 for 2019.
We are also proud to present that ASMO International is a new effort by ASMO Malaysia which started in 2017 in Pattaya, Thailand. When it was initially launched, the competition was setup via collaboration with ASMOPSS and ASMO Thai was the host for the competition. In 2018, Malaysia has become the host for the competition and it was participated by 10 Asian countries.
The idea of opening up a new competition platform which is ASMO International is to expand the level of competition and to provide more opportunities for primary and secondary school students to experience international engagement. (sc : http://asmo2u.com/about-us)
Berikut ini problems and solution ASMO 2019 grade 3
1. Calculate \(299 999+29 999+2 999+299+29+9=？\)
2. What is the perimeter for the diagram below?
3. How many quadrilaterals are there in the diagram below?
4. Identify the pattern and fill in the blanks：
\(1 × 9 + 2 = 11\)
\(12 × 9 + 3 = 111\)
\(123 × 9 + 4 = 1111\)
\(1234567 × 9 + 8 =(\;\;\;\;\;\;)\)
5. It is known that – = 36, =+++
find the value of
6. \(240，120，（ Y ），30，15，…\)
Based on the pattern of the number line above, calculate the sum of the first and the third number.
7. In between 10 and 40, how many multiples of 3 are there?
8. 12 children line up to exercise. The distance between each child is 6m. How long is the line?
9. Two boards that are nailed together has a length of 160cm. The overlapping section has a length of 45cm. One of the board has a length of 85cm, what is the length of the other board?
10. Jia Xin used 3 days to finish reading a book. She read 27 pages on the first day and 54 pages on the remaining 2 days. What is the average number of pages read by Jia Xin each day?