Sentences with BIJECTIVE
Check out our example sentences below to help you understand the context.Sentences
1
"A bijective function is a function that is both injective and surjective."
2
"In mathematics, a bijective map is a function that has both a unique output and a unique input for every element in the domain and codomain."
3
"The bijective property allows for a one-to-one correspondence between the elements of two sets."
4
"A bijective function is also called a one-to-one correspondence or a bijection."
5
"The bijective nature of the function ensures that every element in the domain is paired with a distinct element in the codomain."
6
"The bijective function guarantees that every element in the codomain has a unique pre-image in the domain."
7
"A function is bijective if and only if it is both injective and surjective."
8
"In set theory, a bijective function is often used to establish the equivalence between two sets."
9
"A bijective transformation preserves the cardinality of sets by maintaining a one-to-one mapping."
1
"A function f(x) is bijective if it is both injective and surjective."
2
"The function y = 2x is a bijective mapping from the set of real numbers to itself."
3
"In set theory, a bijective function is also known as a one-to-one correspondence."
4
"A bijective function has a unique inverse."
5
"The function f(x) = x^3 is not bijective because it is not injective."
6
"A bijective function preserves the cardinality of sets."
7
"A linear transformation is bijective if and only if its determinant is non-zero."
8
"The function f(x) = e^x is bijective from the set of real numbers to the set of positive real numbers."
9
"A bijective function can be thought of as a perfect pairing of elements from two sets."
10
"The function f(x) = 1/x is bijective from (0,∞) to (-∞,0)."
11
"A bijective function has a well-defined two-sided inverse."
12
"The bijection between the set of natural numbers and the set of even natural numbers is an example of a bijective function."
13
"A permutation is a bijective function from a set to itself."
14
"The function f(x) = x^2 is not bijective because it is not surjective."
15
"A bijective function can be graphically represented as a one-to-one correspondence."
16
"The inverse of a bijective function is also a bijective function."
17
"A bijective function maps distinct elements to distinct images."
18
"The function f(x) = sin(x) is bijective from the interval [-π/2, π/2] to the interval [-1, 1]."
19
"A bijective function can be visualized as a perfect pairing of points in a coordinate plane."
20
"The bijective function f(x) = 2x + 1 maps the set of natural numbers to the set of odd natural numbers."
