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In function graphing, a horizontal translation is a transformation which results in a graph that is equivalent to shifting the base graph left or right in the direction of the ''x''-axis. A graph is translated ''k'' units horizontally by moving each point on the graph ''k'' units horizontally. For the base function ''f''(''x'') and a constant ''k'', the function given by ''g''(''x'') = ''f''(''x'' − ''k''), can be sketched ''f''(''x'') shifted ''k'' units horizontally. If function transformation was talked about in terms of geometric transformations it may be clearer why functions translate horizontally the way they do. When addressing translations on the Cartesian plane it is natural to introduce translations in this type of notation: : (''x'',''y'') → (''x'' + ''a'', ''y'' + ''b'') or ''T''((''x''·''y'')) = (''x'' + ''a'' . ''y'' + ''b'') where ''a'' and ''b'' are horizontal and vertical changes. ==Example== Taking the parabola ''y'' = ''x''2 , a horizontal translation 5 units to the right would be represented by ''T''((''x'',''y'')) = (''x'' + 5, ''y''). Now we must connect this transformation notation to an algebraic notation. Consider the point (''a''.''b'') on the original parabola that moves to point (''c'',''d'') on the translated parabola. According to our translation, ''c'' = ''a'' + 5 and ''d'' = ''b''. The point on the original parabola was ''b'' = ''a''2. Our new point can be described by relating ''d'' and ''c'' in the same equation. ''b'' = ''d'' and ''a'' = ''c'' − 5. So ''d'' = ''b'' = ''a''2 = (''c'' − 5)2 Since this is true for all the points on our new parabola the new equation is ''y'' = (''x'' − 5)2. 抄文引用元・出典: フリー百科事典『 ウィキペディア(Wikipedia)』 ■ウィキペディアで「Horizontal translation」の詳細全文を読む スポンサード リンク
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