Wisdom Education Institute started Mathematics Examination with three goals
To create a platform to identify students having above-average intelligence by conducting challenging competitive exams and encourage them by giving scholarships.
To transform the subject of Mathematics into an exciting journey for students with average intelligence, we aim to dispel their fears by helping them grasp fundamental mathematical concepts. Our goal is to encourage these students to approach problem-solving with a deep understanding, rather than relying on mechanical or methodical approaches.
In today’s competitive landscape, students must take multiple entrance exams after completing their 12th/ H.S.C. exam to secure admissions in their desired academic fields. Mathematics is a mandatory subject in these exams, and WEI exams assist students in preparing for the mathematics component at the school level.
How & why this activity was started?
At WEI, we thought of starting with this activity for two reasons.
A. The typical Mathematics syllabus at school level does not help in clearing mathematical concepts of students. It contains more numerical problems and a very small no. of word problems. As students get the hang of the method of solving particular type of sums, they go on solving similar sums just mechanically. But if a sum is given in a worded format almost 90% students can not solve it.
Eg. If you give a 7th std. student a sum such as
Q1. The square of the sum of two consecutive even natural numbers is 1444. Find the smallest of them.
Students can solve such word problems on quadratic equations only when their conceptual mathematical knowledge is strong enough. For example, the above problem can be solved if following concepts are clear in a student’s mind.
- Assumption of the smallest unknown even number.
- Difference between two consecutive even numbers is 2
- Formation of an equation
- Use of identities
Solution: Let the smallest of two even numbers be x.
∴ the greatest of the two consecutive even numbers be x+2
∴ (x + x+2 )2 = 1444
⇒ (2x+2 )2 = 1444
⇒ 4×2 + 8x + 4 =1444
⇒ 4×2 + 8x – 1440=0
⇒ 4(x2 + 2x – 360)=0
⇒ x2 + 20x – 18x – 360=0
x(x+20) – 18(x+20) = 0
(x+20) (x-18) = 0
∴x + 20 = 0 or x – 18 = 0
∴x=-20 or x=18
-20 can not be the answer since the answer should be natural number.
∴x=18 is the correct answer.
Q 2. Find the solution set of x2-4x-21=0
Solution: The simple solution involves finding the factors of -21 in such a way that the addition of the factors is -4.
-21=(-7) x (+3) and -7+3 =-4
So you can write the given expression using the factors of -21as
x2-7x+3x-21=0
Make two pairs (underlined) and then take the common factor out.
x(x-7)+3(x-7)=0
Again take out the common factor that is (x-7)
So (x-7)(x+3)=0
When the product of (x-7) and (x+3) is zero, then either
(x-7) =0 or (x+3) = 0
This means
x=7 or x=-3
So,
The solution set of x2-4x-21=0 is {7, -3}.
Once such a method is understood, students can find the solution set of any quadratic equation (a numerical problem). But if these students are given a following problem, even 10% students can’t solve it.
In our text books as well as the Scholarship examination papers, 90% problems are word problems. So students have to think while solving them, which helps in getting clarity about mathematical concepts. Ample practice of solving such word problems helps in application of such conceptual knowledge in a correct manner.
B. After 12th or graduation, students have to appear for JEE / CET(Common Entrance Test) to get a foothold on their chosen career paths. Mathematics is one of the subjects in CET. Students who have been solving sums methodically till 12th standard too get good marks in mathematics and so both parents and students gain an inept confidence of having a good grasp of the subject. Unfortunately such students can not achieve good scores in CET due to lack of strong conceptual knowledge of mathematics and ability to apply it properly as all the questions in CET exam are application based.
So we at WEI, decided to help students prepare for such competitive exams right from their schooling days. So we started to conduct an exam which
- Will have a slightly tougher syllabus than typical school level
- Will help students gain a strong conceptual knowledge of mathematics and ability to apply it properly
- Will help them learn to make quick mental calculations to solve the paper within the given time slot
- And will give them good practice of solving MCQ (multiple choice questions) papers.
Today, we can say proudly that during last decade we have primarily accomplished our aim. Many rank holder students in our exams have secured admission in I.I.T. institutions. Some students have been selected to represent India at International levels in Mathematics, Chemistry and Astronomy Olympiads and they have made us all proud by winning medals at such competitions. We have received calls for many such students and their parents giving our application based exams due credit for the success they achieved at such levels.