Applied Mathematics – Mathematical Reasoning



Published 05/2022
MP4 | Video: h264, 1280×720 | Audio: AAC, 44.1 KHz, 2 Ch
Genre: eLearning | Language: English + srt | Duration: 33 lectures (3h 19m) | Size: 3.55 GB


IIT-JEE Main & Advanced | BITSAT | SAT | MSAT | MCAT | State Board | CBSE | ICSE | IGCSE
What you’ll learn
Introduction
Statements
New Statements from Old
Special Words/Phrases
Implications
Validating Statements
Requirements
Basic knowledge of mathematics of 9th and 10th std Mathematics
Description
Mathematical Reasoning
Mathematically acceptable statements
Connecting words/ phrases – consolidating the understanding of "if and only if (necessary and sufficient) condition", "implies", "and/or", "implied by", "and", "or", "there exists" and their use through variety of examples related to real life and Mathematics
Validating the statements involving the connecting words difference between contradiction, converse and contrapositive
SUMMARY
1. A mathematically acceptable statement is a sentence which is either true or false.
2. Explained the terms
– Negation of a statement p: If p denote a statement, then the negation of p is denoted by ∼p.
– Compound statements and their related component statements: A statement is a compound statement if it is made up of two or more smaller statements. The smaller statements are called component statements of the compound statement.
– The role of "And", "Or", "There exists" and "For every" in compound statements.
– The meaning of implications "If ", "only if ", " if and only if ". A sentence with if p, then q can be written in the following ways.
– p implies q (denoted by p ⇒ q)
– p is a sufficient condition for q
– q is a necessary condition for p
– p only if q – ∼q implies ∼p
– The contrapositive of a statement p ⇒ q is the statement ∼ q ⇒ ∼p . The converse of a statement p ⇒ q is the statement q ⇒ p. p ⇒ q together with its converse, gives p if and only if q.
3. The following methods are used to check the validity of statements: (i) direct method (ii) contrapositive method (iii) method of contradiction (iv) using a counter example.
Who this course is for
Complete Mathematics for Engineering Entrance Exam Preparation. ( IIT-JEE Main | Advanced | BITSAT | SAT | etc.)
State Board | CBSE | ICSE | IGCSE | Course for High School & College
Courses are suitable for students from over 160 countries from Europe, America, Middle East, Asia, Africa and APAC. Notably England, Germany, France, Sweden, Ireland, Scotland, USA, Canada, UAE, Saudi, Qatar, Kuwait, Malaysia, Indonesia, Myanmar, Newzealand, Australia, South Africa, South Korea, Nigeria, Nepal, Sri Lanka, etc
Homepage

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