23 and Mathematics

Today is 23rd day of the month. Watch this video to understand the number 23 mathematically.

30 and Mathematics

How to find Rational Number between two numbers

Number between two Rational Number:-
There are infinitely many Rational number between two rational numbers. If you are asked to find 5 Natural numbers between 5 and 15 then you would have begun with the smallest number 5 and added 1 to get 6, then consecutively and continuously adding 1 to the previous number you would have obtained the number between two Natural numbers.

Question: - Can you find 5 natural number or whole number between 3 and 4?
Answer:- Absolutely not, there is no natural or whole number lying between 3 and 4.
Now come to rational number and here you can find the infinite many rational numbers between two numbers.

First Method: - If m and n be two rational numbers such that m < n then 1/2 (m + n) is a rational number between m and n. Question:- Find 3 rational Number between 3 and 4? Answer: - 1st number between 3 and 4 is ( 3 + 4 )/2 = 7/2 2nd Number between 3 and 7/2 is (3 + 3.5) / 2 = 3.25 3rd Number between 3 and 3.25 is ( 3 + 3.25) / 2 = 3.125 Second Method:- Multiply the numerator and denominator of both the number by 10, 100 …

Third Method:- To find the rational number between two number p and q there is a beautiful formula that will help you to find the rational number easily.

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Uses of Quadrilateral in our life

Uses of Quadrilateral in our life:-
a) In architecture quadrilateral are the most common shape used in architecture. Triangles and quadrilaterals can both make amazing shapes. Here is an architectural design of a house and as you can see that in involves only the use of different shapes of quadrilaterals.

b) The vast majority of properties are bounded by quadrilaterals. Nearly all papers and magazines are quadrilateral, as the footprints of most boxes, the shapes of many rooms, the walls of all houses and the floor in most of the cases are in in shape of quadrilaterals. A general quadrilateral with all sides of different lengths and no parallel sides may not be suitable for such tiling when it is repeated. We tend to use/choose those shapes that are suitable for packing and tiling. The use of golden triangle is evident in the construction of the pyramid. The value of Golden number is 1.618033989 and an angle based on this will have size arc sec (1.618033989) = 510 50’ and the sides of Pyramid rises at an angle of 510 52’. The second interesting part of pyramid is about its perimeter that is 365.24 the number of days in the year. The famous Parathenon temple in Athenes have also been based on the theory of Golden rectangle.

c) Diagonal of a rectangle divides it into two congruent triangles and the idea of congruency especially in triangles had been used by Egyptians to build The Great Pyramids of Giza
The idea of congruency of triangles initially from diagonal of quadrilaterals also helped Leonardo Da Vinci to paint the world famous 'Monalisa'!!!!! The Monaslisha painting is of dimension 73 cm x 53 cms which is obviously a rectangular shape. Some mathematicians believe that the Leonardo da Vinci used the principle of Golden rectangle while painting Monalisa. A group of researcher from University of California, San Diego and the University of Toronto discovered that the distance between a wonan’s eyes and the distance between her eyes and her mouth are the key factors in determining how attractive she is to others and this ratio is nothing but the Golden ratio discussed above.

d)

e)

So enjoy reading

Dr Rajesh Kumar Thakur
rkthakur1974@gmail.com

Quadrilateral during Vedic Time

Quadrilateral during Vedic Time:-
Vedas are the rich source of our knowledge. During this period the rituals to please gods by means of Yagna were high. The rituals was an extremely important part of the ancient Hindu religion. Fire altars were constructed to perform yagna and they were made with precision in different shapes and size. Geometrical rules found in the Sulvasutras, therefore, refers to the construction of squares and rectangles, the relation of the diagonal to the sides, equivalent rectangles and squares, equivalent circles and squares, conversion, of oblongs into squares and vice versa, and the construction of squares equal to the sum or difference of two squares. In such relations a prior knowledge of the Pythagorean Theorem, that the square of the hypotenuse of a right-angled triangle is equal to the sum of squares of the other two sides, is disclosed.
Sulba means pieces of Chord or string and Sutra means formula. The Sulba sutras are the mathematical discoveries by famous Indian rishis turned mathematicians at about 1000 BC to 200 BC, using a piece of chord for constructions of various fire sacrifice altars.

Fire altar

The purpose of the rituals was to build an immortal body that would transcend suffering and death, both hallmarks of mortal existence. According to Plofker:-
Many of the altar shapes involved simple symmetrical figures such as squares and rectangles, triangles, trapezia, rhomboids, and circles. Frequently, one such shape was required to be transformed into a different one of the same size. Hence the Śulba-sūtra rules often involve what we would call area–preserving transformations of plane figures, and thus include the earliest known Indian versions of certain geometric formulas and constants. . In an article published in Indian Journal of Histroy of Science “Ritual Geometry in India and its Parallelism in other Cultural areas” – by Mr. A. K. Bag where he writes that the construction of altars having drawn on a base of different figures such as square, circle, semi- circle, isosceles trapezium, triangle, rhombus, falcon or tortoise shape and other led to the development of various geometrical figures, their transformations and calculation of areas involving many Pythagorean relations with rational and irrational numbers leading to its general statement, approximation of the value of √2 and others. Here is the shape of Mahavedi that is in shape of Isosceles Trapezoid trapezium of area 972 sq. units with 24 and 30 units of length for parallel sides and 36 units of length for altitude with the shape of Square and Rectangle within.

Dr Rajesh Kumar Thakur
rkthakur1974@gmail.com

Quadrilateral -1

Can you guess which one is the largest highway project in India? Don’t worry, I am giving you a clue. This is the project started in 2001 by the PM Atal Bihari Vajpayee. See the map below and concentrate on a mathematical term emerging out from this map. One more thing about this project is that in this project four major metropolitan cities – Delhi, Mumbai, Kolkatta and Chennai will be linked with each other.

Source: - National Highway Authority in India

Don’t worry, Let me tell you the name of this project so that you can guess the topic we will discuss now in details. The name of this project is Golden Quadrilateral.
The above examples are enough to show that quadrilateral is a geometrical shape that consists of four edges (Sides) and four vertices (corner).Quadrilaterals, like triangles are the second most common shape used in geometry. It is a geometric shape that consists of four vertices sequentially joined by straight line segments.
The word ‘quadrilateral is derived from the two Latin word – quadri and latus. The first word quadri means four whereas the word latus refers for side. In other words, quadrilateral is a figure having four sides.
According to the Merriam- Webster Dictionary a quadrilateral is a geometrical shape having four sides. The Collins Dictionary defines quadrilateral as a polygon having four sides and a complete quadrilateral consists of four lines and their six points of intersections. The other words sometimes used for quadrilateral are quadrangle and tetragon.
A quadrilateral is generally of three types – Convex quadrilateral, Concave quadrilateral and Simple quadrilateral.
A quadrilateral that has an angle more than 1800 is called Concave Quadrilateral. A quadrilateral is called simple if the four sides of a quadrilateral meet at vertices. Here we shall only focus on convex quadrilateral where each angle is less than 180.

Dr Rajesh Kr Thakur
rkthakur1974@gmail.com

Fundamental of Mathematics for Secondary and Senior Secondary level

Secondary and Senior Secondary level

Secondary level is the stage where mathematics comes to the students as an academic discipline. It is a stage where students begin to perceive the structure of mathematics. Mathematical terminology gets sophisticated and the concept of proof becomes the central to curriculum. The new branch of mathematics Trigonometry and Co-ordinate geometry get introduced. The working of secondary level is somehow based on the learning the concept of primary and upper primary level. Mathematics at this stage is totally based on concept and reasoning. The theoretical part of mathematics begins and students find it irritating. A bigger question now arises: - What does mathematics really consist of? Mathematics in secondary and senior secondary level consists of Axioms, Theorems, Definitions, Theories, Formulas and Methods. Mathematics could surely not exist without these ingredients; they are all essential. Now the question is what a secondary student should do to enhance his mathematical skill. Polya says – To a mathematician, who is active in research, mathematics may appear sometimes as a guessing game; you have to guess a mathematical theorem before you prove it, you have to guess the idea of the proof before you carry through all the details. Mathematical facts are first guessed and then proven. If the learning of mathematics has anything to do with the discovery to do problems in which he first guesses and then proves some mathematical facts on an appropriate level.

• The student needs to integrate the techniques and basics learnt at the previous level.

• Students at this stage should have practical knowledge of why this and why not this. Reasoning helps to retain the learning for long and you not only understand the principle of mathematics but also understand its practical application.

• Students should have the knowledge of finding square, square root, cube and cube root of any number. It is also expected from the student in secondary level to have memorized the square up to 50 and cube up to 30 so that calculation can be done with ease without error. If possible learn the fourth power and fifth power up to 5 of first 10 numbers.

• They should learn some technique that can help them to calculate speedy. There are ample books available in market which will prove beneficial in order to calculate faster. Vedic Mathematics is now a popular book used by students for fast calculation. The best part of learning some trick to do arithmetical calculation faster is that you save ample time in your examination and the chance of your doing right calculation increase. Besides that student should also learn method to counter check calculation so that the chance of error is avoided. There is one simple and sophisticated technique to counter check the calculation in seconds. The method CASTING OUT NINES method will be beneficial to students in checking the calculation.

• In geometry, first learn about different shapes and its properties. Since the geometry of secondary level is highly based on some theorems so it is advised to students to learn the important statement of theorems so that they can write the statement or name of the theorem in proving a geometrical proof.

• Word problem is another area that needs to be addressed. Understanding mathematical language is equally important to do word problem. So before going through the exercise learn the most frequently used mathematical terms.

• Solving algebraic problem is considered a tough task but I have noticed students performing well in algebra once they understand the language of the word problem. Confusion creates when you don’t remember the formula to be applied at the appropriate problem and look for another way of solving the problem. Algebraic problem may be turned into a joyful game once you understand how to proceed with the problem. So before doing the algebra, learn algebraic identities, get mastery over understanding mathematical language of the problem.

• Trigonometry is introduced in Class 10th in India and students feel uneasy when they solve the problem or prove the identities. You must understand the fact that Trigonometry is the backbone of mathematics in senior secondary level. If you are not good at Trigonometry in secondary level, you will have baskets of problem as Differential and Integral Calculus taught in class 12 can’t be done without clear understanding of Trigonometry. In trigonometry, you must learn the formulas based on trigonometric ratios and understand the principle on which the finding of different angles such as 0, 30, 45, 60 and 90 are based so that when you go in class 11, you can extend these principle in finding the value of different angles such as-120, 135,150,180,---360 and more.

• Last but not the least, at the secondary stage; a special emphasis should be done on experimentation and exploration. Make model and visit mathematics laboratory whenever possible. Mathematics can’t learn alone by merely learning formulas until you master mathematics by practicing. This practical aspect of learning can be achieved only if you make mathematical model, play mathematical brain twister and visit mathematical laboratory to understand the mathematical concept with the help of diagram and mathematical shapes kept in laboratory. Activities in practical mathematics help students immensely in visualization.

Dr Rajesh Thakur
rkthakur1974@gmail.com