代微积拾级：修订间差异

{{from|1=A<span style{{=}}"font-size: 70%;>RTICLE</span> (157.) I<span style{{=}}"font-size: 70%;>N</span> the Differential Calculus, as in Analytical Geometry, there are two classes of quantities to be considered, viz., ''variables'' and ''constants''.<br><br>Variable quantities are generally represented by the last letters of the alphabet, ''x'', ''y'', ''z'', etc., and any values may be assigned to them which will satisfy the equations into which they enter.<br><br>Constant quantities are generally represented by the firstletters of the alphabet, ''a'', ''b'', ''c'', etc., and these always retain the same values throughout the same investigation.<br><br>Thus, in the equation of a straight line, <br><div style="text-align: center;"><math>y=ax+b</math>,</div>the quantities a and b have but one value for the same line, while ''x'' and ''y'' vary in value for every point of the line.<br><br>(158.) '''One variable is said to be a ''function'' of another variable, when the first is equal to a certain algebraic expression containing the second.''' Thus, in the equation of a straight line <br><div style="text-align: center;"><math>y=ax+b</math>,</div>''y'' is a function of ''x''. <br><br>So, also, in the equation of a circle, <br><div style="text-align: center;"><math>y=\sqrt{R^2-x^2}</math>;</div>and in the equation of the ellipse, <br><div style="text-align: center;"><math>y=\frac{B}{A}\sqrt{2Ax-x^2}</math>.</div>(159.) When we wish merely to denote that ''y'' is ''dependent'' upon ''x'' for its value, without giving the particular expression which shows the value of ''x'', we employ the notation<br><div style="text-align: center;"><math>y=F(x)</math>, or <math>y=f(x)</math>,<br><span style{{=}}"text-align: left; float: left;">or</span><math>x=F(y)</math>, or <math>x=f(y)</math>,</div>which expressions are read, ''y'' is a function of ''x'', or ''x'' is a function of ''y''.|2=''Elements of Analytical Geometry and of The Differential and Integral Calculus'', Differential Calculus, Section I, Definitions and First Principles}}