14 ଗାଣିତିକ କାରଣ

ବିବିଧ ବ୍ୟାୟାମ

Question:

Check the validity of the statements given below by the method given against it (i) p : The sum of an irrational number and a rational number is irrational (by contradiction method) (ii) q : If n is a real number with n>3 then n^2>9 (by contradiction method)

Answer:

(i) p : The sum of an irrational number and a rational number is irrational (by contradiction method)

Assume that the sum of an irrational number and a rational number is rational. Let x be an irrational number and y be a rational number. Then, x + y = z, where z is a rational number. This contradicts the fact that the sum of an irrational number and a rational number is irrational. Therefore, the statement p is true.

(ii) q : If n is a real number with n>3 then n^2>9 (by contradiction method)

Assume that n is a real number with n>3 but n^2≤9. Then, n^2 - 9 ≤ 0 Therefore, n^2 - 9< 0 This contradicts the fact that n>3. Therefore, the statement q is true.

Question:

Write the following statement in five different ways conveying the same meaning p : If triangle is equiangular then it is an obtuse angled triangle

Answer:

  1. If a triangle is equiangular, then it is an obtuse angled triangle.
  2. A triangle which is equiangular is also an obtuse angled triangle.
  3. If a triangle is equiangular, its angles are obtuse.
  4. Equiangular triangles are obtuse angled triangles.
  5. Obtuse angled triangles are always equiangular.

Question:

Write the negation of the following statements: i) p : For every positive real number x the number x−1 is also positive ii) q : All cats scratch iii) r : For every real number x, either x>1 or x<1 iv) s : There exist a number x such that 0<x<1

Answer:

i) p : There exists a positive real number x such that x−1 is not positive.

ii) q : Not all cats scratch.

iii) r : For every real number x, neither x>1 nor x<1.

iv) s : There does not exist a number x such that 0<x<1.

Question:

Write each of the statements in the form “if p then q” (i) p : It is necessary to have a password to log on to the server (ii) q : There is traffic jam whenever it rains (iii) r : You can access the website only if you pay a subscription fee

Answer:

(i) If it is necessary to have a password to log on to the server then q.

(ii) If it rains then there is traffic jam.

(iii) If you pay a subscription fee then you can access the website.

Question:

Given below are two statements p : 25 is a multiple of 5 q : 25 is a multiple of 8 Write the compound statements connecting these two statements with “And” and “Or” In both cases check the validity of the compound statement

Answer:

Using ‘And’: p And q: 25 is a multiple of 5 and 25 is a multiple of 8. Validity: False

Using ‘Or’: p Or q: 25 is a multiple of 5 or 25 is a multiple of 8. Validity: True

Question:

Re write each of the following statements in the form “p if and only if q” (i) p : If you watch television then your mind is free and if your mind is free then you watch television (ii) q : For you to get an A grade it is necessary and sufficient that you do all the homework regularly (iii) r : If a quadrilateral is equiangular then it is a rectangle and if a quadrilateral is a rectangle then it is equiangular

Answer:

(i) You watch television if and only if your mind is free. (ii) You do all the homework regularly if and only if you get an A grade. (iii) A quadrilateral is equiangular if and only if it is a rectangle.

Question:

State the converse and contrapositive of each of the following statements: (i) p : A positive integer is prime only if it has no divisors other than 1 and itself (ii) q : I go to a beach whenever it is a sunny day (iii) r : If it is hot outside then you feel thirsty

Answer:

(i) Converse: If a positive integer has no divisors other than 1 and itself, then it is prime.

Contrapositive: If a positive integer is not prime, then it has divisors other than 1 and itself.

(ii) Converse: If I go to a beach, then it is a sunny day.

Contrapositive: If it is not a sunny day, then I do not go to a beach.

(iii) Converse: If you feel thirsty, then it is hot outside.

Contrapositive: If it is not hot outside, then you do not feel thirsty.

JEE ଅଧ୍ୟୟନ ସାମଗ୍ରୀ (ଗଣିତ)

01 ସେଟ୍

02 ସମ୍ପର୍କ ଏବଂ କାର୍ଯ୍ୟ

03 ଟ୍ରାଇଗୋନେଟ୍ରିକ୍ କାର୍ଯ୍ୟଗୁଡ଼ିକ

04 ଗାଣିତିକ ଅନୁକରଣର ନୀତି

05 ଜଟିଳ ସଂଖ୍ୟା ଏବଂ ଚତୁର୍ଭୁଜ ସମୀକରଣ

06 ରେଖା ଅସମାନତା

07 ଅନୁମତି ଏବଂ ମିଶ୍ରଣ

08 ଦ୍ୱିପାକ୍ଷିକ ତତ୍ତ୍।

09 କ୍ରମ ଏବଂ କ୍ରମ

10 ସିଧା ଲାଇନ ବ୍ୟାୟାମ

10 ସିଧା ରେଖା ବିବିଧ

11 କନିକ୍ ବିଭାଗ

12 ତିନୋଟି ଡାଇମେନ୍ସନାଲ୍ ଜ୍ୟାମିତିର ପରିଚୟ

13 ସୀମା ଏବଂ ଡେରିଭେଟିଭ୍

14 ଗାଣିତିକ କାରଣ

15 ପରିସଂଖ୍ୟାନ

16 ସମ୍ଭାବନା