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- MCQs: Ch 02 Sets, Functions and Groups @fsc-part1-ptb:mcq-bank
- objects is called - Relation - Sets - Function - None of these - The objects in a set are ... \sim p \wedge \sim q$ - Every relation is - Function - Cartesian product - May or may not be function - None of these - For two non-empty sets $A$... - Binary operation - Binary relation - Function - None of these - The set of the first elem
- Definitions: FSc Part 1 (Mathematics): PTB
- w q)\wedge (p \vee q)$ is the contingency. * **Function:** Let $A$ and $B$ be two non-empty set sets. If\... $F$ have same 1st elements. Then $F$ is called a function from $A$ to $B$ and is written as $F:A \to B$ denoted by $y=f(x)$. * **Bijective function:** (1-1 and onto) A function f which is both one to one and onto is called bijective function. * **Inje
- Definitions: FSc Part 1 (Mathematics): PTB by Aurang Zaib
- of \( p \) and \( q \) and false for others. ====Function==== A function is a relation between two non-empty sets \( A \) and \( B \), where each element of set \( A... ( A = \{1, 2, 3\} \) and \( B = \{a, b, c\} \). A function \( f: A \rightarrow B \) could be defined as \( f(1) = a, f(2) = b, f(3) = c \). ====Bijective Function==== A bijective function is a function that is bo
- MCQs: Ch 04 Quadratic Equations @fsc-part1-ptb:mcq-bank
- d as a - Non-linear equation - Polynomial function of $x$ - Both $A$ and $B$ - None of these... - $-9$ - $18$ - The graph of a quadratic function - Hyperbola - Straight line - Parabol... ty - None of these - The graph of quadratic function is - Circle - Parabola - Triangle ... splaystyle{-\frac{34}{9}}$ - If $a>0$, then the function $f(x)=ax^2+bx+c$ has - Maximum value - Mi
- Ch 11: Trigonometric Functions and Their Graphs @fsc-part1-ptb:important-questions
- Lahore(2017)// * Show that $\sin x$ is periodic function and its period is $2\pi$ --- // FBISE(2017)// * Find the period of cosine function --- // FBISE(2017)// </list-group> {{tag>