^RDC-meg20 1NEMETHYNTQQQQQQDNhiel0S0g+WHP DeskJet 870C Major head011JNC11JdMinor head0F0JNL11JdMinor head0F0JNL11JdMinor head0F0JNL11JdMinor head0F0JNL11JdMinor head0F0JNL11Jd61 0docLast save ˆNTIIIIIUDNhiel0S0g+WHP DeskJet 870C Heading level 1+,algebra ,,ii ,symbols ,neme? ,ref};e ,%eetListng level 1plus or positive3 TX+\TXListng level 1m9us or negative3 TX-\TXListng level 1"ts dot3 TX*\TXListng level 1"ts cross3 TX@*\TXListng level 1divid$ by3 TX./\TXListng level 14positive or negative (plus or m9us)_3 TX+-\TXListng level 1is equal to3 TX.k\TXListng level 1is n equal to3 TX/.k\TXListng level 1is less ?an3 TX"k\TXListng level 1is grt} ?an3 TX.1\TXListng level 1%is less ?an or equal to3 TX"k:\TXListng level 1'is grt} ?an or equal to3 TX.1:\TXListng level 1(is approximately equal to3 TX@:@:\TXListng level 1p}c5t3 TX@0\TXListng level 1set braces3 TX.( .)\TXListng level 1A! ratio ( TX;a\TX to TX;b,\TX or ?a/b#_3 TXa "1 b\TXListng level 1is 3gru5t to3 TX@:.k\TXListng level 1is p}p5dicul> to3 TX$p\TXListng level 1is p>allel to3 TX$l\TXListng level 1is simil> to3 TX@:\TXListng level 1ÕVdegree(s)_3ÕW TX^.*\TXListng level 1Listng level 1El9e 3ta9+ po9ts TX;,a\TX & TX;,b_3\TX TX",a,b<$[33o]\TXListng level 1Fl9e seg;t ) 5dpo9ts TX;,a\TX & TX;,b_3\TX TX",a,b<:]\TXListng level 1Fray ) 5dpo9t TX;,a\TX & 3ta9+ TX;,b_3\TX TX",a,b<$o]\TXListng level 1Lvector ) orig9 TX;,a\TX & 5dpo9t TX;,b_3\TX TX",a,b<$33@o]\TXListng level 11circle ) c5t} TX;,a_3\TX TX$c_$*] ,a\TXListng level 1)>c TX,a,b,c_3\TX TX",a,b,c<$a]\TXListng level 1Tl5g? ( TX",a,b<:}\TX, 4t.e 2t TX;,a\TX & TX;,b_3\TX TX,a,b\TXListng level 1Gtriangle ) v}tices1 ;,a, ;,b, & TX;,c_3\TX TX $t ,a,b,c\TXListng level 1Hangle ) sides TX",b,a<$o}\TX & TX",b,c<$o}_3 $[ ,a,b,c\TXListng level 1.angle ) v}tex TX;,b_3\TX TX$[ ,b\TXListng level 1+m1sure ( TX${ ,a,b,c_3 m$[ ,a,b,c\TXListng level 1corresponds to3 TX$[33o\TXListng level 1*;p implies TX;q_3\TX TXp $o q\TXListng level 18! log>i?m1 base ;a, ( TX;b_3\TX TXlog;a b\TXListng level 11! TX;nth\TX p{} ( TX;a_3\TX TXa^n\TXListng level 1;n factorial3 TXn&\TXListng level 1,! TX;nth\TX t}m (a sequ;e3 TXa;n\TXListng level 1G! summn TXa1+a2+ ''' +a;n_3\TX TX ".,s%k .k #1e root ( TX;x_3\TX TX>x]\TXListng level 13! m1n ( data values ( TX;x_3\TX TXx:\TXListng level 1?specific values (! v>ia# TX;x_3\TX TXx1, x2, etc4\TXListng level 1?specific values (! v>ia# TX;y_3\TX TXy1, y2, etc4\TXListng level 1A;f ( ;x, ! value (! func;n ;f at TX;x_3\TX TXf(x)\TXListng level 1GÕVf(g(x)),ÕW ! -posi;n ( func;ns ;f & TX;g_3\TX TXf.*g(x)\TXListng level 1.! 9v}se func;n ( ÕVf(x)_3ÕW TXf^-1"(x)\TXListng level 1-pi (approximately ÕV#3.1416)_3ÕW TX.p\TXListng level 1F! base ( natural log>i?ms (approximately ÕV#2.71828)_3ÕW TX;e\TXListng level 1Zord}$ pair ) ;x-coord9ate TX;a\TX & ;y-coord9ate TX;b_3\TX TX(a, b)\TXListng level 1-! -ple;t ( ev5t TX;,a_3\TX TX,a:\TXListng level 1C! numb} ( -b9ns ( ;r items | ( TX;n_3\TX TX;n",c;r\TXListng level 1E! numb} ( p}mutns ( ;r items | ( TX;n_3\TX TX;n",p;r\TXListng level 1;! numb} ( ways an ev5t TX;,a\TX c o3ur3 TXn(,a)\TXListng level 14! probabil;y ( ev5t TX;,a_3\TX TX,p(,a)\TXListng level 1O! probabil;y ( ev5t ;,b, giv5 t ev5t TX;,a\TX o3urs3 TX,p(,b \ ,a)\TXListng level 1's9e ( TX$[ ,a_3\TX TXsin ,a\TXListng level 1)cos9e ( TX$[ ,a_3\TX TXcos ,a\TXListng level 1*tang5t ( TX$[ ,a_3\TX TXtan ,a\TXListng level 1,cosecant ( TX$[ ,a_3\TX TXcsc ,a\TXListng level 1*secant ( TX$[ ,a_3\TX TXsec ,a\TXListng level 1,cotang5t ( TX$[ ,a_3\TX TXcot ,a\TXListng level 1Listng level 1+,prep>$ 0,gloria ,b5nett & ,susan ,o/}hausListng level 1',texas ,s*ool =! ,bl & ,visuy ,impair$Listng level 1$,au/91 ,texas -- ,janu>y1 #2000