sour and sweet
It is possible to give an example of non-linear, but I have no idea what a non-example is. Is a non-example of linear a curve. That would be my first thought but not sure
A banana is a good non-example. Evaporation is a process whereas a banana is an object, and so clearly a non-example.
A relation may be in 2NF if 1. it is in 1NF & 2. Every non prime attribute functional dependent on primary attribute
Sexism.
i dont know how to answer it but just once i like to make it nikko14
A non-example of a function is the relation where a single input corresponds to multiple outputs. For instance, if we consider a relation that assigns a person to their favorite colors, where one person can have multiple favorite colors, this does not satisfy the definition of a function. In a function, each input must have exactly one output. Thus, the relation fails to meet the criteria of a function.
A linear relationship whose graph does not pass through the origin: for example, the relation between temperatures on the Celsius and Fahrenheit scales.
A non-example of a function is a relation where an input corresponds to multiple outputs. For instance, consider the relation that assigns a person to their favorite colors; one person might list several favorite colors, which means the input (the person) leads to multiple outputs (the favorite colors). This violates the definition of a function, which requires that each input is associated with exactly one output.
A factor is a number that divides another number evenly without leaving a remainder. For example, 2 is a factor of 8 because 8 divided by 2 equals 4 with no remainder. A non-example of a factor would be 3 in relation to 8, since 8 divided by 3 does not result in a whole number.
examples of number relation problems
non-existant...
what is a non example for locate
"Pink" is a non-example.
what is the non example of hydrosphere
It is possible to give an example of non-linear, but I have no idea what a non-example is. Is a non-example of linear a curve. That would be my first thought but not sure
An example of a relation that is a function but whose inverse is not a function is the relation defined by the equation ( f(x) = x^2 ) for ( x \geq 0 ). This function maps each non-negative ( x ) to a non-negative ( y ), making it a valid function. However, its inverse, ( f^{-1}(y) = \sqrt{y} ), does not satisfy the definition of a function when considering the entire range of ( y ) values (since both positive and negative values of ( y ) yield the same ( x )). Thus, the inverse is not a function.
A banana is a very good non-example.