Changes

<p>Considered in extensional form, <math>f_Q\!</math> is the subset of <math>X \times \underline\mathbb{B}</math> that is given by the following formula:</p>

<p>Considered in extensional form, <math>f_Q\!</math> is the subset of <math>X \times \underline\mathbb{B}</math> that is given by the following formula:</p>

<p><math>f_Q \ = \ \{ (x, b) \in X \times \underline\mathbb{B} \ : \ b = \underline{1} \ \Leftrightarrow \ x \in Q \}.</math></p></li>

<p><math>f_Q ~=~ \{ (x, b) \in X \times \underline\mathbb{B} ~:~ b = \underline{1} ~\Leftrightarrow~ x \in Q \}.</math></p></li>

<li>

<li>

<p>Considered in functional form, <math>f_Q\!</math> is the map from <math>X\!</math> to <math>\underline\mathbb{B}</math> that is given by the following condition:</p>

<p>Considered in functional form, <math>f_Q\!</math> is the map from <math>X\!</math> to <math>\underline\mathbb{B}</math> that is given by the following condition:</p>

<p><math>f_Q (x) = \underline{1} \ \Leftrightarrow \ x \in Q.</math></p></li>

<p><math>f_Q (x) = \underline{1} ~\Leftrightarrow~ x \in Q.</math></p></li>

</ol>

</ol>

{| align="center" cellpadding="8" width="90%"

{| align="center" cellpadding="8" width="90%"

| <math>\operatorname{Fiber~of}~ y ~\operatorname{under}~ f \ = \ f^{-1} (y) \ = \ \{ x \in X : f(x) = y \}.</math>

| <math>\operatorname{Fiber~of}~ y ~\operatorname{under}~ f ~=~ f^{-1} (y) ~=~ \{ x \in X : f(x) = y \}.</math>

 

 

| <math>\operatorname{Fiber~of}~ \underline{1} ~\operatorname{under}~ f_Q ~=~ f_Q ^{-1} (\underline{1}) ~=~ \{ x \in X : f_Q (x) = \underline{1} \} ~=~ Q.</math>

|}

|}

<pre>

<pre>

Fiber of %1% under f_Q  =  (f_Q)^(-1)(%1%)  =  {x in X  :  f_Q (x) = %1%}  =  Q.

Fiber of %1% under f_Q  =  (f_Q)^(-1)(%1%)  =  {x in X  :  f_Q (x) = %1%}  =  Q.