# ch-14(mathematical reasoning).pdf

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There are few things which we know which are not capable of mathematical r easoning and when these can not, i t i s a sign that our

knowledge of them is very small and confused and where a mathematical reasoning can be had, it i s as great a foll y to make use of another, as to grope for a thing in the dark when you have a candle stick

standing by you. – ARTH ENBOT

14.1 Introduction

In this Chapter, we shall discuss about some basic ideas of Mathematical Reasoning. All of us know that human beings evolved from the lower species over many millennia. The main asset that made humans “ superior ” to other species was the ability to reason. How well this ability can be used depends on each person’s power of reasoning. How to develop this power? Here, we shall discuss the process of reasoning especially in the context of mathematics.

In mathematical language, there are two kinds of reasoning – inductive and deductive. We have already discussed the inductive reasoning in the context of mathematical induction. In this Chapter, we shall discuss some fundamentals of deductive reasoning.

14.2 Statements The basic unit involved in mathematical reasoning is a mathematical statement .

Let us start with two sentences:

In 2003, the president of India was a woman.

An elephant weighs more than a human being.

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George Boole (1815 - 1864)

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When we read these sentences, we immediately decide that the first sentence is false and the second is correct. There is no confusion regarding these. In mathematics such sentences are called statements .

On the other hand, consider the sentence:

Women are more intelligent than men .

Some people may think it is true while others may disagree. Regarding this sentence we cannot say whether it is always true or false . That means this sentence is ambiguous. Such a sentence is not acceptable as a statement in mathematics.

A sentence is call ed a mathemati call y acceptable statement i f i t is either

tr ue or f alse but not both. Whenever we mention a statement here, it is a“mathematically acceptable ” statement. While studying mathematics, we come across many such sentences. Some examples are:

Two plus two equals four.

The sum of two positive numbers is positive.

All prime numbers are odd numbers.

Of these sentences, the first two are true and the third one is false . There is no ambiguity regarding these sentences. Therefore, they are statements.

Can you think of an example of a sentence which is vague or ambiguous? Consider the sentence:

The sum of x and y is greater than 0 Here, we are not in a position to determine whether it is true or false, unless we

know what x and y are. For example, it is false where x = 1, y = –3 and true when x = 1 and y = 0. Therefore, this sentence is not a statement. But the sentence:

For any natural numbers x and y, the sum of x and y is greater than 0 is a statement.

Now, consider the following sentences :

How beautiful! Open the door.

Where are you going? Are they statements? No, because the first one is an exclamation, the second

an order and the third a question. None of these is considered as a statement in mathematical language. Sentences involving variable time such as “today”, “tomorrow” or “yesterday” are not statements. This is because it is not known what time is referred here. For example, the sentence

Tomorrow is Friday

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is not a statement. The sentence is correct (true) on a Thursday but not on other days. The same argument holds for sentences with pronouns unless a particular person is referred to and for variable places such as “here”, “there” etc., For example, the sentences

She is a mathematics graduate.

Kashmir is far from here. are not statements.

Here is another sentence

There are 40 days in a month. Would you call this a statement? Note that the period mentioned in the sentence

above is a “variable time” that is any of 12 months. But we know that the sentence is always false (irrespective of the month) since the maximum number of days in a month can never exceed 31. Therefore, this sentence is a statement. So, what makes a sentence a statement is the fact that the sentence is either true or false but not both.

While dealing with statements, we usually denote them by small letters p, q, r, ... For example, we denote the statement “ Fire is always hot ” by p. This is also written

as p: Fire is always hot.

Example 1 Check whether the following sentences are statements. Give reasons for your answer.

(i) 8 is less than 6. (ii) Every set is a finite set.

(iii) The sun is a star. (iv) Mathematics is fun.

(v) There is no rain without clouds. (vi) How far is Chennai from here?

Solution (i) This sentence is false because 8 is greater than 6. Hence it is a statement.

(ii) This sentence is also false since there are sets which are not finite. Hence it is a statement.

(iii) It is a scientifically established fact that sun is a star and, therefore, this sentence is always true. Hence it is a statement.

(iv) This sentence is subjective in the sense that for those who like mathematics, it may be fun but for others it may not be. This means that this sentence is not always true. Hence it is not a statement.

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(v) It is a scientifically established natural phenomenon that cloud is formed before it rains. Therefore, this sentence is always true. Hence it is a statement.

(vi) This is a question which also contains the word “Here”. Hence it is not a statement.

The above examples show that whenever we say that a sentence is a statement we should always say why it is so. This “why” of it is more important than the answer.

EXERCISE 14.1

1. Which of the following sentences are statements? Give reasons for your answer.

(i) There are 35 days in a month. (ii) Mathematics is difficult.

(iii) The sum of 5 and 7 is greater than 10.

(iv) The square of a number is an even number.

(v) The sides of a quadrilateral have equal length.

(vi) Answer this question.

(vii) The product of (–1) and 8 is 8.

(viii) The sum of all interior angles of a triangle is 180 °.

(ix) Today is a windy day.

(x) All real numbers are complex numbers.

2. Give three examples of sentences which are not statements. Give reasons for the answers.

14.3 New Statements from Old We now look into method for producing new statements from those that we already have. An English mathematician, “George Boole” discussed these methods in his book “The laws of Thought” in 1854. Here, we shall discuss two techniques.

As a first step in our study of statements, we look at an important technique that we may use in order to deepen our understanding of mathematical statements. This technique is to ask not only what it means to say that a given statement is true but also what it would mean to say that the given statement is not true.

14.3.1 Negation of a statement The denial of a statement is called the negation of the statement. Let us consider the statement:

p: New Delhi is a city The negation of this statement is

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It is not the case that New Delhi is a city

This can also be written as

It is false that New Delhi is a city.

This can simply be expressed as

New Delhi is not a city.

Definition 1 If p is a statement, then the negation of p is also a statement and is denoted by ∼ p, and read as ‘not p’.

Note While forming the negation of a statement, phrases like, “It is not the

case” or “It is false that” are also used. Here is an example to illustrate how, by looking at the negation of a statement, we

may improve our understanding of it. Let us consider the statement

p: Everyone in Germany speaks German.

The denial of this sentence tells us that not everyone in Germany speaks German. This does not mean that no person in Germany speaks German. It says merely that at least one person in Germany does not speak German.

We shall consider more examples.

Example 2 Write the negation of the following statements.

(i) Both the diagonals of a rectangle have the same length.

(ii) 7 is rational.

Solution (i) This statement says that in a rectangle, both the diagonals have the same length. This means that if you take any rectangle, then both the diagonals have the same length. The negation of this statement is

It is false that both the diagonals in a rectangle have the same length

This means the statement

There is atleast one rectangle whose both diagonals do not have the same length.

(ii) The negation of the statement in (ii) may also be written as

It is not the case that 7 is rational.

This can also be rewritten as

7 is not rational.

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