ELF \4( UWVS‰Љ4E艅@@U艕<<Dž84UEU؉*PJbUЉ8t0EP(h+EARhPEjUMˍ RP 4UEUUUEP4 jEP{vEUэPVEUэP2EUэPEUэPh9hEUJQURP 4UEUUUEP4 jEP[vhAhEUJQURP 4UEUUUEP4 jEPvhIhEUJQURP 4tDžxU|tEP4 jEP2.hhQhP}Quv4 EtjE艅,,E;,u#v,j,RӍvЃtEPR11v틅4\Dž`d*Jb\@tW+8@Љ009@u 0j0PӍv4 틅4DDžHL*JbDEtiU艕,,E;,u#v,j,PӍvЃtEPR4 v[^_ÐUhh hPhh`hPhhhPhhhPhh hPhhAhPhh`hPhhhPhhhPhh hPhhOhPhhhPhhhPhhhPhhhPhhhPhhhPhh hPhh`hPÉUhhEPhEPЉÉUhhEPPhEPhPPPPÉUhhE}v0j EARhPEʉhhhPhhRE}@~ }C ?vU¿ÉUhhEPhhhEPhEPE$EPhhEPvÉUhhEPhhhEPhEPE$EPhhEPvÉUHh1hEPhhLhEPhhbhEPhhxhEPhhhEPhEЃ$Eȃ$E$E؃$EPEP0hhhPÉU8hhEPhhhEPhhhEPhE؃$EPE$EPEPEPEP0}t0E$hhPhhhEPh*hPPÉUhChEPhhWhEPhE$EP$hfhPPÉUhhE}vPh(EARhPEURE몉ÉUEPhhEPvÉUhhEPhhhEPhEPEPPhEPhhPPPPhEPEPPhEPhhPPPPvÉUS]| S 4]Ív01.01Polynomials have all been initialized.: .derivative: A + B: A - B: A * B: Invalid command.|P|||||||||||||||||l|0|T||||||x||x||----------------- The Commands -----------------S - set the current Polynomial to work on - - - - - - - - - - - -1 - use the assign_coef function2 - use the add_to_coef functionC - use the clear functionV - view the current polynomial by using <<A - view all polynomials by using <<D - view derivative of current polynomialE - evaluate current polynomial by using () opG - use the gif functionN - use the next_term and previous_term functionsR - use the test_root function+ - view A + B- - view A - B* - view A * BQ - quit this interactive test program------------------------------------------------->) (degree is .Enter the polynomial you want to work on: Enter exponent: Enter coefficient: After adding: After assigning: Enter file name to write: Enter upper x bound: Enter lower x bound: Enter upper y bound: Enter lower y bound: The file has been writtenEnter the initial guess: Enter the maximum iterations: Enter epsilon: Root found: No root found. Number of iterations: Enter the x value: For the poly: The evaluation returned is After clearing: For polynomial: ) = next_term(previous_term(US]uu S]ÐGCC: (GNU) cplusplus 2.95.4 20020320 [FreeBSD].symtab.strtab.shstrtab.rel.text.data.bss.note.rel.rodata.rel.gnu.linkonce.t.__cl__CQ214main_savitch_410polynomiald.comment4X ' %+0: 6 2h F$B 3 }0  L!<M, 1=GL]~ N  4 7 bB8 z3P` :>>V!2DU<L#"spolytest1.cxxgcc2_compiled.__toupper__FiMANY__terminate__sjthrowmain__get_eh_context__Q214main_savitch_410polynomialcout__ls__7ostreamPCc__ls__7ostreamcendl__FR7ostream__ls__7ostreamPFR7ostream_R7ostreamprint_menu__Fvget_command__Fvset_current__Fvtest_assign__FRQ214main_savitch_410polynomialtest_add__FRQ214main_savitch_410polynomialtest_clear__FRQ214main_savitch_410polynomialview__FRCQ214main_savitch_410polynomialview_all__FPCQ214main_savitch_410polynomialderivative__CQ214main_savitch_410polynomialUi_$_Q214main_savitch_410polynomialtest_eval__FRCQ214main_savitch_410polynomialtest_gif__FRCQ214main_savitch_410polynomialtest_np__FRCQ214main_savitch_410polynomialtest_root__FRCQ214main_savitch_410polynomial__pl__14main_savitch_4RCQ214main_savitch_410polynomialT1__mi__14main_savitch_4RCQ214main_savitch_410polynomialT1__ml__14main_savitch_4RCQ214main_savitch_410polynomialT1__builtin_vec_deletecin__rs__7istreamRcdegree__CQ214main_savitch_410polynomial__ls__14main_savitch_4R7ostreamRCQ214main_savitch_410polynomial__ls__7ostreamUi__rs__7istreamRUi__rs__7istreamRdadd_to_coef__Q214main_savitch_410polynomialdUiassign_coef__Q214main_savitch_410polynomialdUi__rs__7istreamPcmake_gif__14main_savitch_4RCQ214main_savitch_410polynomialPCcddddfind_root__CQ214main_savitch_410polynomialRdRbRUidUid__ls__7ostreamd__cl__CQ214main_savitch_410polynomialdclear__Q214main_savitch_410polynomialnext_term__CQ214main_savitch_410polynomialUiprevious_term__CQ214main_savitch_410polynomialUi___toupper_CurrentRuneLocaleeval__CQ214main_savitch_410polynomiald `#.@HMR]em 16A^t!F j!"#$ATY^x%&+Hm)'v &t'   $/:BGLWbjot     * 2 7 < G R Z _ d o z                     " ' , 7 B J O T _ j r w |                ( )B J Y *g s x +  ,          ! & 1 < A F Q     ( -    ( . /   " > C H W (\ -g l q  ( . 0        ( 1  (%.05:I(N.Y^cr(w.(.2$3(8.CHM\(a-lqv(.34 %*5,@Z_ds(x.54 0AFQn6(-27@OTYd,oz,8,,%92:dhlptx| ;