| S |
|
| salaries tax |
Á~ĵ| |
| sample |
©â¼Ë¡F¼Ë¥» |
| sample mean |
¼Ë¥»¥§¡¼Æ |
| sample space |
¼Ë¥»ªÅ¶¡ |
| sampling distribution |
©â¼Ë¤À§G |
| sampling theory |
©â¼Ë²z½× |
| sandwich theorem |
¢ªñ©w²z |
| satisfy |
º¡¨¬¡F¾A¦X |
| scalar |
¯Â¶q; µL¦V¶q, ¼Ð¶q |
| scalar matrix |
¯Â¶q¯x°} |
| scalar multipliction |
¯Â¶q¼ªk |
| scalar product |
¯Â¶q¿n |
| scalar triple product |
¯Â¶q¤T«¿n |
| scale |
¤ñ¨Ò¤Ø¡F¼Ð«×¡F¹Ï¤Ø |
| scalene triangle |
¤£µ¥Ãä¤T¨¤§Î¡F¤£³W«h¤T¨¤§Î |
| scatter diagram |
´²ÂI¹Ï |
| Schwartz's inequality |
¬I¥Ë¯÷¤£µ¥¦¡ |
| scientific notation |
¬ì¾Ç°O¼Æªk |
| secant |
(1)¥¿³Î; (2)³Î½u |
| secant method |
¥¿³Îªk |
| second |
’ |
| second derivative |
¤G¶¥¾É¼Æ |
| second order ordinary differential equation |
¤G¶¥±`·L¤À¤èµ{ |
| second quartile |
²Ä¤G¥|¤À¦ì¼Æ(1)ºI±¡FºI½u¡F(2)ºIÂI |
| section |
(1)ºI±¡FºI½uúø¡F(2)ºIÂI |
| section formula |
ºIÂI¤½¦¡ |
| sector |
®°¦¡ |
| segment |
¬q¡F¸` |
| segment of a circle |
¤}§Î |
| selling price |
°â»ù |
| semicircle |
¥b¶ê |
| semi-conjugate axis |
¥b¦@³m¶b |
| semi-major axis |
¥b¥D¶b; ¥bªø¶b |
| semi-minor axis |
¥b°Æ¶b; ¥bµu¶b |
| semi-transverse axis |
¥b³e¶b |
| semi-vertical angle |
¥b³»¨¤ |
| sentence |
¥y¡F»y¥y |
| separable differential equation |
¥i¤À·L¤À¤èµ{ |
| septic equation |
¤C¦¸¤èµ{ |
| sequence |
§Ç¦C |
| series |
¯Å¼Æ |
| set |
¶° |
| set square |
¤T¨¤¤Ø¡F¤T¨¤ªO |
| set-builder form |
¶°ªºµ²ºc¦¡ |
| shaded portion |
¦³³±¼v³¡¤À |
| shape |
§Îª¬ |
| shear |
¦ì²¾ |
| side |
Ãä¡F°¼ |
| sign |
²Å¸¹¡F°O¸¹ |
| signed number |
¦³²Å¸¹¼Æ |
| significance level |
ÅãµÛ©Ê¤ô¥ |
| significant figure |
¦³®Ä¼Æ¦r |
| signum |
¥¿t¸¹¨ç¼Æ |
| similar |
¬Û¦ü |
| similar figures |
¬Û¦ü¹Ï§Î |
| similar triangles |
¬Û¦ü¤T¨¤§Î |
| similarity |
¬Û¦ü(©Ê) |
| simple equation |
²©ö¤èµ{ |
| simple harmonic motion |
²¿Ó¹B°Ê |
| simple interest |
³æ§Q¡F³æ§Q®§ |
| simple iteration method |
²³æ¡¥Nªk |
| simple pendulum |
³æÂ\ |
| simplify |
²¤Æ |
| Simpson's integral |
´Ë»¹¿n¤À |
| Simpson's rule |
´Ë»¹ªk«h |
| simultaneous differential equations |
·L¤À¤èµ{²Õ; Áp¥ß·L¤À¤èµ{ |
| simultaneous equations |
Áp¥ß¤èµ{ |
| simultaneous inequalities |
Áp¥ß¤£µ¥¦¡ |
| simultaneous linear equations in two unknowns |
Áp¦X¤G¦¸½u©Ê¤èµ{¦¡ |
| sine |
¥¿©¶ |
| sine formula |
¥¿©¶¤½¦¡ |
| singleton |
³æ¤¸¶° |
| single-valued function |
³æȨç¼Æ |
| singular |
©_ªº |
| singular matrix |
©_²§¯x°}; ¤£¥i°f¯x°} |
| skew distribution |
°¾±×¤À§G |
| skew line |
°¾±×½u |
| slant edge |
±×Ù± |
| slant height |
±×°ª |
| slope |
±×²v¡F±×«×¡F¶É±×¡F©Y«× |
| slope-intercept form |
±×²vºI¶Z¦¡¡F±×ºI¦¡ |
| soild with uniform corss-section |
¦³§¡¤Ã¾î¤Á±ªº¥ßÅé |
| solid |
¥ßÅé¡F©TÅé |
| solid of revolution |
±ÛÂàÅé; °j±ÛÅé |
| solution |
¸Ñ¡F¸Ñªk |
| solution of equation |
¤èµ{¸Ñ |
| solution of triangle |
¤T¨¤§Î¸Ñªk |
| solution set |
¸Ñ¶° |
| solve |
¸Ñ |
| span |
¥Í¦¨ |
| special angle |
¯S®í¨¤¡F¯S§O¨¤ |
| speed |
³t²v |
| sphere |
²y§Î¡F²y± |
| spheroid |
²yÅé |
| spiral |
Á³½u |
| square |
(1)¥¤è¡F(2)¥¿¤è§Î |
| square bracket |
¤è¬A¸¹ |
| square matrix |
¤è(¯x)°} |
| square number |
¥¿¤è§Î¼Æ¡F¥¤è¼Æ |
| square root |
¥¤è®Ú¡F¤G¦¸®Ú |
| squeeze theorem |
¢ªñ©w²z |
| stability |
Ã«× |
| standard deviation |
¼Ð·Ç®t¡F¼Ð·Ç°¾Â÷ |
| standard equation |
¼Ð·Ç¤èµ{ |
| standard error |
¼Ð·Ç»~®t |
| standard form |
¼Ð·Ç¦¡ |
| standard normal distribution |
¼Ð·Ç¥¿ºA¤À§G; ¼Ð·Ç±`ºA¤À§G |
| standard score |
¼Ð·Ç¤À |
| standard unit |
¼Ð·Ç³æ¦ì |
| statement |
»y¥y |
| statement calculus |
©RÃDºtºâ |
| static friction |
ÀR¿iÀ¿ |
| statics |
ÀR¤O¾Ç |
| stationary |
¥Ã |
| stationary point |
¥ÃÂI; ³r¯dÂI; ¾nÂI |
| stationary value |
¥ÃÈ |
| statistical chart |
²Îp¤ÀªR |
| statistical data |
²Îp¹Ïªí |
| statistical significance |
²Îp¼Æ¾Ú |
| statistics |
²ÎpÅãµÛ©Ê |
| step |
²Îp; ²Îp¾Ç |
| step function |
¶¥±è¨ç¼Æ |
| straight line |
ª½½u |
| straight line graph |
ª½½u¹Ï¹³ |
| strictly monotonic |
ÄY®æ³æ½Õ |
| strictly monotonic function |
ÄY®æ³æ½Õ¨ç¼Æ |
| subject |
¥D¶µ |
| submultiple angle formula |
¥b¨¤¤½¦¡ |
| subnormal |
¦¸ªk½u |
| subsequence |
¤l(§Ç)¦C |
| subset |
¤l¶° |
| subsidiary angle |
»²§U¨¤ |
| substitute |
¥N¤J |
| substitution |
¥N¤J; ¥N¤Jªk |
| subtangent |
¦¸¤Á½u |
| subtend |
¹ï¦V |
| subtract |
´î |
| subtraction |
´îªk |
| successive approximation |
³v¦¸¹Gªñªk |
| successive derivative |
³v¦¸¾É¼Æ |
| successive differentiation |
³v¦¸·L¤Àªk |
| sufficiency |
¥R¥÷©Ê |
| sufficient and necessary condition |
¥Rn±ø¥ó |
| sufficient condition |
¥R¥÷±ø¥ó |
| sufficiently close |
¥R¥÷±µªñ |
| suffix |
¤U¼Ð |
| sum |
©M |
| sum to infinity |
µL¶µ¤§©M |
| sum to n terms |
n ¶µ©M |
| sum to product formula |
©M¤Æ¿n¤½¦¡ |
| summation |
¨D©Mªk; Á`©M |
| summation formula |
¨D©M¤½¦¡ |
| superimposing |
Å|¦X |
| super set |
¥À¶° |
| supplementary angle |
¸É¨¤ |
| surd |
®Ú¦¡; ¤£ºÉ®Ú |
| surface |
±; ªí± |
| surface area |
ªí±±¿n; ¦±±±¿n |
| surface of revolution |
±ÛÂ঱±; °jÂ঱± |
| surjection |
º¡®g |
| surjective function |
º¡®g¨ç¼Æ; ¬M¦¨¨ç¼Æ |
| syllogism |
¤T¬q½× |
| symbol |
²Å¸¹; °O¸¹ |
| symmetrix difference |
¹ïºÙ®t |
| symmetric expression |
¹ïºÙ¦¡ |
| symmetric relation |
¹ïºÙÃö«Y |
| symmetry |
¹ïºÙ; ¹ïºÙ©Ê |
| synthetic division |
ºî¦X°£ªk |
| system |
¨t²Î; Åé¨t; ²Õ; ¨t |
| system of circles |
¶ê±Ú; ¶ê¨t |
| system of numerals |
°O¼Æ¨t²Î |
| system of straight lines |
ª½½u±Ú; ª½½u¨t |
