the_o art_n of_o number_v by_o speaking-rod_n vulgar_o term_v nepeirs_n bone_n by_o which_o the_o most_o difficult_a part_n of_o arithmetic_n as_o multiplication_n division_n and_o extract_v of_o root_n both_o square_a and_o cube_n be_v perform_v with_o incredible_a celerity_n and_o exactness_n without_o any_o charge_n to_o the_o memory_n by_o addition_n and_o substraction_n only_o publish_a by_o w._n l._n london_n print_v for_o g._n sawbridge_n and_o be_v to_o be_v sell_v at_o his_o house_n on_o clerkenwell-green_a 1667._o the_o argument_n to_o the_o reader_n the_o right_a honourable_a john_n lord_n nepeir_n baron_n of_o merchiston_n in_o scotland_n in_o the_o composure_n of_o those_o ever_o to_o be_v admire_v table_n of_o his_o invention_n call_v logarithm_n find_v his_o calculation_n so_o laborious_a in_o long_a and_o tedious_a multiplication_n division_n and_o extract_v of_o root_n that_o his_o invention_n to_o he_o must_v needs_o render_v itself_o very_o unpleasant_a have_v he_o not_o know_v that_o the_o labour_n when_o finish_v will_v crown_v both_o he_o and_o his_o work_n he_o advise_v with_o divers_a learned_a man_n studious_a in_o the_o science_n mathematical_a and_o to_o they_o and_o among_o they_o especial_o to_o mr._n henry_n briggs_n who_o by_o a_o learned_a and_o able_a divine_a be_v style_v and_o not_o without_o due_a respect_n our_o english_a archimedes_n to_o he_o i_o say_v this_o honourable_a lord_n impart_v his_o invention_n who_o join_v issue_n with_o he_o in_o this_o herculean_a labour_n bring_v they_o to_o that_o perfection_n to_o which_o they_o be_v now_o to_o the_o admiration_n of_o all_o europe_n arrive_v in_o the_o tedious_a calculation_n of_o these_o number_n the_o author_n find_v his_o work_n to_o go_v on_o but_o very_o slow_o at_o length_n study_v out_o for_o some_o help_n by_o art_n to_o assist_v he_o in_o this_o his_o noble_a enterprise_n think_v upon_o several_a help_n at_o last_o by_o the_o blessing_n of_o god_n he_o happen_v to_o find_v out_o this_o which_o i_o here_o intend_v to_o describe_v and_o show_v the_o use_n of_o with_o some_o addition_n and_o variation_n from_o what_o he_o have_v himself_o do_v in_o his_o treatise_n in_o latin_a publish_v and_o print_v at_o edinburgh_n in_o scotland_n in_o anno_fw-la 1617._o entitle_v rabdologiae_n seu_fw-la numerationis_fw-la per_fw-la virgulas_fw-la the_o use_n whereof_o i_o shall_v in_o the_o follow_a tractate_n endeavour_v to_o render_v so_o plain_a and_o easy_a that_o he_o that_o can_v but_o add_v and_o subtract_v shall_v be_v make_v able_a in_o a_o day_n time_n and_o less_o to_o multiply_v and_o divide_v any_o great_a number_n nay_o and_o to_o extract_v both_o the_o square_n and_o cube_n root_n i_o have_v begin_v this_o treatise_n with_o the_o fabric_n and_o inscription_n of_o these_o rod_n according_a to_o the_o author_n description_n which_o be_v not_o so_o convenient_a either_o for_o portability_n or_o practice_n as_o some_o other_o which_o i_o have_v see_v and_o use_v i_o have_v describe_v they_o i_o think_v in_o the_o best_a manner_n they_o possible_o can_v be_v contrive_v for_o their_o use_n i_o be_o sure_a i_o have_v do_v more_o than_o hitherto_o i_o have_v see_v do_v and_o if_o i_o mistake_v not_o to_o as_o good_a and_o effectual_a purpose_n i_o do_v not_o publish_v it_o as_o a_o novelty_n neither_o do_v i_o attribute_v much_o in_o it_o to_o myself_o beside_o the_o method_n for_o have_v i_o not_o be_v desire_v i_o shall_v hardly_o have_v think_v upon_o it_o however_o it_o be_v do_v accept_v it_o and_o use_v it_o till_o i_o direct_v something_o else_o to_o thou_o which_o may_v be_v more_o acceptable_a till_o when_o i_o bid_v thou_o hearty_o farewell_o place_v this_o figure_n at_o the_o begin_n of_o the_o book_n fig_n 2._o fig_n 3._o fig_n 4._o square_n cube_n chap._n i._n concern_v the_o fabric_n and_o inscription_n of_o these_o rod_n in_o the_o forego_n argument_n i_o tell_v you_o that_o the_o author_n and_o inventor_n of_o this_o kind_n of_o instrument_n of_o which_o i_o intend_v to_o show_v the_o use_n call_v it_o rabdologia_n and_o the_o word_n he_o thus_o define_v rabdologia_fw-la est_fw-la ars_fw-la computandi_fw-la per_fw-la virgulas_fw-la numeratrice_n that_o be_v rabdologie_n be_v the_o art_n of_o count_v by_o number_v rods._n i._o of_o the_o fabric_n of_o these_o rod_n according_a to_o the_o inventors_n description_n of_o they_o these_o rod_n may_v be_v make_v either_o o●_n silver_n brass_n box_n ebony_n or_o ivory_n of_o which_o last_o substance_n i_o suppose_v the●_n be_v at_o first_o make_v for_o that_o they_o ar●_n for_o the_o most_o part_n by_o all_o that_o know_v or_o use_v they_o called_z nepairsbones_o but_o let_v the_o matter_n of_o which_o they_o be_v make_v be_v what_o it_o will_v their_o form_n according_a to_o this_o description_n i●_n exact_o a_o square_a parallelepipedon_n 〈◊〉_d the_o length_n be_v about_o three_o inch_n and_o the_o breadth_n of_o they_o about_o one_o ten_o part_n of_o the_o length_n but_o the_o length_n of_o these_o rod_n be_v not_o confine_v to_o three_o inch_n but_o let_v the_o length_n be_v what_o it_o will_v the_o breadth_n must_v be_v a_o ten_o part_n thereof_o but_o that_o may_v be_v account_v a_o competent_a breadth_n that_o be_v capable_a of_o receive_v of_o two_o numerical_a figure_n for_o there_o be_v never_o upon_o one_o rod_n require_v more_o to_o be_v set_v on_o the_o breadth_n thereof_o the_o breadth_n of_o these_o rod_n be_v exact_o one_o ten_o part_n of_o the_o length_n thereof_o when_o 10_o of_o these_o be_v lay_v together_o they_o do_v exact_o make_v a_o geometrical_a square_n and_o if_o 20_o of_o they_o be_v tabulate_v or_o lay_v together_o they_o will_v make_v a_o right-angled_n parallelogram_n who_o length_n be_v double_a to_o its_o breadth_n if_o 30_o be_v tabulate_v the_o figure_n will_v be_v still_o a_o parallelogram_n who_o length_n will_v be_v three_o time_n the_o breadth_n and_o so_o if_o 40_o four_o time_n the_o length_n 65_o si●_n 650._o the_o rod_n be_v thus_o prepare_v of_o exact_a length_n and_o breadth_n let_v each_o of_o they_o be_v divide_v into_o 10_o equal_a part_n with_o this_o proviso_n that_o nine_o of_o the_o ten_o part_n stand_v in_o the_o middle_n of_o each_o rod_n and_o the_o other_o ten_o part_n must_v be_v divide_v into_o two_o part_n half_z whereof_z must_v be_v set_v at_o the_o one_o end_n and_o the_o other_o half_a at_o the_o other_o end_n o●_n the_o same_o rod._n then_o from_o side_n t●_n side_n draw_v right_a line_n from_o division_n ●●_o division_n so_o be_v your_o rod_n divide_v into_o square_n on_o every_o side_n thereof_o last_o from_o corner_n to_o corner_n of_o ever●_n of_o these_o square_n draw_v a_o diagonal_a line_n and_o that_o will_v divide_v ever●_n square_a into_o two_o triangle_n th●_n rod_n be_v thus_o prepare_v and_o line●_n first_o into_o square_n and_o then_o into_o triangle_n they_o be_v then_o fit_a to_o be_v number_v the_o figure_n 〈◊〉_d at_o the_o begin_n of_o the_o book_n show_v the_o form_n of_o one_o of_o these_o rod_n line_v as_o it_o ought_v to_o be_v chap._n ii_o how_o these_o rod_n be_v to_o be_v number_v in_o the_o two_o half_a square_n which_o be_v at_o the_o end_n of_o each_o rod_n on_o every_o side_n there_o be_v set_v one_o single_a figure_n on_o each_o side_n of_o every_o rod_n one_o in_o the_o division_n at_o the_o end_n thereof_o so_o every_o rod_n contain_v four_o side_n ten_o rod_n will_v contain_v 40_o side_n and_o so_o consequent_o will_v have_v 40_o single_a figure_n at_o the_o end_n of_o every_o of_o they_o that_o be_v there_o will_v be_v upon_o the_o ten_o rod_n among_o they_o four_o figure_n of_o each_o kind_n that_o be_v four_z one_o 1111._o four_o two_o 2222._o four_o three_o 3333._o four_o four_o 4444._o four_o five_o 5555._o four_o six_o 6666._o four_o seven_n 7777._o four_o eight_o 8888._o four_o nine_o 9999._o four_o cipher_n 0000._o and_o here_o it_o be_v to_o be_v note_v that_o what_o figure_n soever_o it_o be_v that_o stand_v at_o the_o top_n of_o the_o rod_n alone_o the_o figure_n that_o stand_v alone_o on_o the_o other_o side_n of_o the_o same_o rod_n make_v that_o figure_n up_o the_o number_n 9_o as_o for_o example_n if_o 1_o stand_v on_o one_o side_n 8_o will_v stand_v on_o the_o other_o side_n so_o 2_o and_o 7_o be_v as_o in_o this_o table_n where_o if_o 1_o stand_v alone_o at_o the_o top_n of_o any_o side_n of_o any_o of_o the_o rod_n than_o 8_o stand_v on_o the_o other_o side_n of_o the_o same_o rod._n 2_o 7_o 3_o stands_z alone_z 6_o stand_v on_o 4_o at_o the_o top_n of_o 5_o the_o other_o if_o 5_o any_o side_n of_o 4_o side_n of_o the_o 6_o any_o of_o the_o 3_o same_o rod._n 7_o rod_n than_o 2_o 8_o 1_o 9_o 9_o 0_o this_o also_o be_v

will_v remain_v 2132_o to_o which_o number_n add_v the_o next_o figure_n of_o your_o dividend_n namely_o 5_o and_o it_o make_v 21325_o under_o which_o number_n draw_v a_o line_n then_o will_v your_o sum_n stand_v thus_o then_o among_o your_o rod_n seek_v the_o near_a number_n to_o 21325_o and_o you_o shall_v find_v 20976_o to_o be_v the_o near_a number_n less_o against_o which_o in_o your_o tabulat_fw-la stand_v 6_o set_z 6_o in_o the_o quotient_a and_o 20976_o under_o the_o line_n substract_v it_o from_o 21325_o which_o when_o you_o have_v do_v there_o will_v remain_v 349_o to_o 349_o add_v the_o next_o figure_n in_o your_o dividend_n which_o be_v 6_o your_o last_o figure_n and_o it_o make_v 3496_o under_o which_o draw_v a_o line_n and_o your_o work_n will_v stand_v as_o here_o you_o see_v this_o do_v look_v among_o your_o rod_n for_o the_o near_a number_n to_o 3496_o and_o you_o shall_v find_v the_o exact_a number_n at_o the_o top_n of_o the_o rod_n against_o which_o stand_v the_o figure_n 1_o on_o the_o tabulat_fw-la set_v 1_o in_o the_o quotient_a and_o subtract_v 3496_o from_o 3496_o the_o remainder_n be_v nothing_o and_o so_o be_v your_o division_n end_v the_o work_n stand_v thus_o and_o 3496_o the_o divisor_n be_v contain_v in_o 912456_o the_o dividend_n 261_o time_n a_o three_o example_n ready_a wrought_v by_o the_o last_o and_o best_a way_n of_o division_n i_o will_v only_o set_v it_o down_o ready_o wrought_v leave_v the_o practice_n of_o it_o to_o yourself_o let_v it_o be_v require_v to_o divide_v 73020506_o by_o 3496._o this_o sum_n thus_o divide_v produce_v in_o the_o quotient_a 20886_o and_o 3050_o remain_v so_o that_o the_o quotient_a with_o fraction_n and_o all_o be_v which_o show_v that_o 3496_o the_o divisor_n be_v contain_v in_o 73020506_o the_o dividend_n 20886_o time_n and_o 3050_o remain_v this_o example_n well_o practise_v together_o with_o they_o before-going_a be_v sufficient_a instruction_n for_o any_o student_n whatever_o and_o he_o that_o can_v perform_v these_o need_n not_o despair_v of_o the_o most_o difficult_a that_o can_v be_v propose_v and_o so_o i_o conclude_v with_o division_n chap._n viii_o concern_v the_o rule_n of_o three_o or_o golden_a rule_n both_o direct_a and_o reverse_v or_o reciprocal_a to_o discourse_n of_o this_o rule_n at_o large_a be_v to_o run_v into_o a_o labyrinth_n for_o it_o be_v the_o performance_n of_o work_a multiplication_n and_o division_n by_o the_o rod_n that_o be_v here_o aim_v at_o and_o he_o that_o can_v multiply_v and_o divide_v may_v command_v this_o golden_a rule_n wherefore_o i_o will_v show_v you_o the_o nature_n or_o order_n of_o place_v the_o number_n and_o also_o the_o manner_n of_o work_v a_o example_n in_o either_o of_o they_o the_o rule_n of_o three_o be_v that_o rule_n which_o teach_v by_o have_v three_o number_n in_o proportion_n one_o to_o another_o give_v to_o find_v a_o four_o which_o shall_v be_v in_o proportion_n to_o they_o also_o in_o this_o rule_n direct_v the_o four_o number_n which_o be_v seek_v be_v to_o have_v the_o same_o proportion_n to_o the_o three_o as_o the_o second_o number_n have_v to_o the_o first_o as_o if_o the_o three_o number_n give_v be_v 2-4_a and_o 8_o say_v as_o 2_o be_v to_z 4_o so_o be_v 8_o to_o what_o multiply_v 4_o by_o 8_o that_o be_v the_o second_o number_n by_o the_o three_o and_o the_o product_n will_v be_v 32_o which_o divide_v by_o 2_o the_o first_o number_n the_o quotient_n will_v be_v 16_o which_o be_v the_o four_o number_n in_o proportion_n to_o the_o three_o as_o the_o second_o be_v to_o the_o first_o for_z as_o 4_o the_o second_o number_n contain_v 2_o the_o first_o number_n twice_o so_o 16_o the_o four_o number_n contain_v 8_o the_o three_o number_n twice_o also_o but_o in_o the_o reciprocal_a rule_n of_o three_o there_o the_o proportion_n be_v not_o as_o the_o first_o to_o the_o second_o so_o the_o three_o to_o the_o four_o but_o as_o the_o first_o be_v to_o the_o three_o so_o be_v the_o second_o to_o the_o four_o as_o if_o the_o number_n be_v 3_o 4_o and_z 6_o say_v as_o 3_o the_o first_o number_n be_v to_o 6_o the_o three_o number_n so_o be_v 4_o the_o second_o number_n to_o what_o multiply_v 4_o the_o second_o number_n by_o 3_o the_o first_o number_n the_o product_n be_v 12_o which_o divideby_o 6_o the_o three_o number_n and_o the_o quotient_n will_v be_v 2_o for_o as_o 6_o the_o three_o number_n contain_v 3_o the_o first_o number_n twice_o so_z 4_o the_o second_o number_n contain_v 2_o the_o four_o number_n twice_o also_o and_o in_o this_o consist_v the_o difference_n between_o the_o direct_a and_o reciprocal_a rule_n of_o three_o a_o question_n in_o each_o rule_n 1._o in_o the_o direct_a rule_n if_o four_o man_n eat_v two_o peck_v of_o corn_n in_o one_o week_n how_o many_o peck_v will_v serve_v a_o hundred_o man_n the_o same_o time_n man_n peck_v men._n 4_o 2_o 100_o multiply_v 2_o the_o second_o number_n by_o 100_o the_o three_o number_n the_o product_n will_v be_v 200_o which_o divide_v by_o 4_o the_o first_o number_n and_o the_o quotient_n will_v be_v 50_o and_o so_o many_o peck_v will_v suffice_v 100_o man_n the_o same_o time_n 2._o in_o the_o reciprocal_a if_o twelve_o man_n do_v any_o piece_n of_o work_n in_o 8_o day_n how_o many_o man_n must_v be_v employ_v to_o do_v the_o same_o piece_n of_o work_n in_o 2_o day_n day_n man_n day_n 8_o 12_o 2._o multiply_v 8_o the_o first_o number_n by_o 12_o the_o second_o their_o product_n be_v 96_o which_o divide_v by_o 2_o the_o three_o number_n the_o quotient_n will_v be_v 48_o and_o so_o many_o man_n will_v do_v the_o same_o work_n in_o 2_o day_n for_o as_o 8_o day_n be_v to_o 2_o day_n so_o be_v 12_o man_n to_o 48_o man_n etc._n etc._n chap._n ix_o of_o the_o extraction_n of_o root_n the_o extraction_n of_o root_n which_o be_v the_o difficult_a part_n of_o multiplication_n and_o division_n be_v expeditious_o and_o certain_o perform_v by_o the_o rod_n for_o the_o easy_a and_o expedite_a performance_n of_o which_o there_o be_v two_o rod_n on_o purpose_n one_o for_o the_o square_n the_o other_o for_o the_o cube_n root_n of_o which_o i_o will_v speak_v first_o of_o their_o fabric_n second_o of_o their_o use_n of_o the_o fabric_n of_o the_o rod_n for_o extract_v of_o root_n of_o the_o same_o matter_n and_o of_o the_o same_o length_n and_o thickness_n of_o your_o other_o rod_n let_v there_o be_v make_v another_o rod_n but_o three_o time_n the_o breadth_n of_o the_o former_a the_o inscription_n on_o one_o side_n serve_v to_o extract_v the_o square_n and_o that_o on_o the_o other_o side_n for_o the_o cube_n root_n each_o of_o which_o be_v divide_v into_o three_o row_v or_o colume_n that_o which_o serve_v for_o the_o square_a root_n have_v in_o the_o top_n or_o uppermost_a square_n between_o the_o diagonal_a thereof_o these_o figure_n 0-1_a in_o the_o second_o 0-4_a in_o the_o three_o 0-9_a in_o the_o four_o 1-6_a in_o the_o five_o 2-5_a in_o the_o six_o 3-6_a in_o the_o seven_o 4-9_a in_o the_o eight_o 6-4_a and_o in_o the_o nine_o or_o lowermost_a 8●_a which_o be_v the_o square_a number_n belong_v to_o the_o nine_o digit_n in_o the_o second_o column_n of_o the_o same_o rod_n in_o the_o first_o square_n be_v inscribe_v 2_o in_o the_o second_o 4_o in_o the_o three_o 6_o in_o the_o four_o 8_o in_o the_o five_o 10_o in_o the_o six_o 12_o in_o the_o seven_o 14_o in_o the_o eight_o 16_o and_o in_o the_o nine_o 18._o in_o the_o last_o or_o three_o column_n there_o be_v the_o nine_o digit_n orderly_o descend_v namely_o 1_o 2_o 3_o 4_o 5_o 6_o 7_o 8_o 9_o this_o rod_n thus_o make_v be_v fit_v for_o the_o square_a root_n that_o which_o serve_v for_o the_o cube_n root_n have_v in_o the_o top_n or_o uppermost_a square_n of_o the_o first_o column_n towards_o the_o left_a hand_n between_o the_o diagonal_a thereof_o these_o figure_n 0-01_a in_o the_o second_o 0-08_a in_o the_o three_o 0-27_a in_o the_o four_o 0-64_a in_o the_o five_o 1-25_a in_o the_o six_o 2-16_a in_o the_o seven_o 3-43_a in_o the_o eight_o 5-12_a and_o in_o the_o nine_o 7-29_a which_o be_v cube_n number_n orderly_o descend_v the_o second_o column_n of_o this_o rod_n contain_v these_o square_a number_n 1_o 4_o 9_o 16_o 25_o 36_o 49_o 64_o 81_o orderly_o descend_v the_o three_o and_o last_o column_n of_o this_o rod_n have_v in_o it_o the_o nine_o digit_n 1_o 2_o 3_o 4_o 5_o 6_o 7_o 8_o 9_o orderly_o descend_v also_o this_o rod_n thus_o prepare_v and_o inscribe_v be_v fit_a for_o extract_v of_o the_o square_a and_o cube_n root_n a_o figure_n of_o either_o side_n whereof_o you_o have_v at_o the_o begin_n of_o the_o book_n that_o which_o

serve_v for_o the_o square_a root_n have_v the_o word_n square_n write_v over_o head_n that_o for_o the_o cube_n root_n have_v cube_n write_v over_o head_n thus_o have_v give_v you_o the_o fabric_n and_o inscription_n of_o these_o rod_n i_o will_v now_o show_v you_o their_o use_n and_o first_o concern_v the_o extract_a of_o the_o square-root_n in_o extract_v of_o the_o square-root_n you_o must_v as_o in_o common_a arithmetic_n when_o you_o have_v set_v down_o your_o number_n make_v a_o prick_n under_o the_o first_o figure_n towards_o your_o right_a hand_n and_o so_o successive_o under_o every_o second_o figure_n then_o under_o those_o prick_n draw_v two_o line_n parallel_v whereinto_o set_v the_o figure_n of_o your_o root_n as_o you_o find_v they_o your_o number_n be_v thus_o place_v and_o prick_v as_o before_o be_v direct_v and_o as_o in_o the_o follow_a example_n you_o see_v do_v you_o may_v proceed_v to_o extract_n the_o root_n thereof_o as_o follow_v example_n 1._o let_v it_o be_v require_v to_o find_v the_o square-root_n of_o this_o number_n 12418576_o first_o make_v a_o prick_n under_o 6_o another_z under_z 5_o another_z under_z 1_o and_z another_z under_z 2_o under_o which_o point_n draw_v two_o line_n in_o which_o you_o must_v place_v your_o root_n and_o then_o will_v your_o number_n stand_v thus_o take_v the_o rod_n for_o extract_v of_o the_o square-root_n and_o look_v in_o the_o first_o row_n or_o column_n thereof_o for_o the_o near_a number_n you_o can_v there_o find_v less_o than_o 12_o which_o be_v as_o far_o as_o the_o first_o prick_n in_o your_o number_n reach_v and_o you_o shall_v find_v 9_o against_o which_o in_o the_o three_o column_n you_o shall_v find_v 3_o set_z 3_o under_o the_o first_o point_n between_o the_o line_n and_o 9_o under_o the_o line_n and_o substract_v 9_o from_o 12_o there_o will_v remain_v 3_o which_o set_v over_o 12_o so_o will_v your_o number_n stand_v thus_o then_o in_o the_o middle_a column_n of_o your_o rod_n between_o 9_o and_o 3_o there_o stand_v 6_o take_v therefore_o one_o of_o your_o rod_n which_o have_v 6_o at_o the_o top_n thereof_o and_o lay_v it_o upon_o your_o tabulat_fw-la by_o the_o left_a side_n of_o your_o square_a rod_n then_o be_v there_o be_v 341_o to_o the_o next_o prick_n seek_v the_o near_a number_n less_o upon_o your_o two_o rod_n and_o you_o shall_v find_v the_o next_o less_o to_o be_v 325_o against_o which_o in_o the_o last_o column_n of_o your_o square_a rod_n stand_v 5_o therefore_o place_v 5_o under_o your_o second_o prick_n and_o set_v 325_o under_o 341_o and_o substract_v it_o from_o 341_o there_o will_v remain_v 16_o which_o set_v over_o head_n then_o will_v the_o sum_n appear_v thus_o and_o in_o the_o middle_a column_n of_o your_o square_a rod_n against_o this_o 5_o there_o stand_v 10_o for_o this_o 10_o you_o shall_v take_v a_o rod_n that_o have_v 10_o at_o the_o top_n but_o be_v there_o be_v no_o such_o take_v therefore_o one_o that_o have_v a_o cypher_n and_o place_n that_o between_o your_o square_a rod_n and_o your_o rod_n of_o 6_o and_o change_v your_o rod_n 6_o for_o one_o of_o 7_o then_o shall_v you_o have_v upon_o your_o tabulat_v one_o rod_n of_o 7_o another_z of_o 0_o and_o your_o square_a rod._n thus_o must_v you_o always_o do_v when_o the_o number_n in_o the_o middle_a column_n exceed_v 10._o then_o look_v upon_o your_o sum_n you_o shall_v find_v 1685_o to_o your_o three_o prick_n look_v therefore_o upon_o your_o rod_n for_o the_o near_o less_o number_n which_o you_o shall_v find_v to_o be_v 1404_o against_o which_o stand_v 2_o in_o the_o last_o column_n set_v 2_o between_o the_o line_n under_o the_o three_o prick_n and_o 1404_o under_o 1685_o and_o substract_v it_o from_o 1685_o and_o there_o will_v remain_v 281_o which_o place_n above_o so_o will_v your_o sum_n stand_v thus_o and_o because_o the_o number_n stand_v against_o in_o the_o middle_a column_n of_o your_o square_a rod_n between_o 1404_o and_o 2_o be_v 4_o set_v 4_o under_o your_o last_o prick_n and_o take_v a_o rod_n of_o 4_o and_o put_v it_o between_o your_o square_a rod_n and_o your_o rod_n of_o 0_o and_o because_o 28176_o remain_v upon_o your_o sum_n to_o the_o last_o prick_n look_v upon_o your_o rod_n for_o the_o near_a number_n thereunto_o and_o you_o shall_v find_v the_o very_a number_n itself_o to_o stand_v against_o the_o figure_n 4_o set_v therefore_o 28176_o below_o and_o subtract_v it_o from_o that_o above_o and_o there_o will_v remain_v nothing_o which_o denote_v the_o number_n 12418576_o to_o be_v a_o square_a number_n and_o the_o root_n thereof_o to_o be_v 3524_o and_o the_o work_n finish_v will_v stand_v thus_o this_o sum_n have_v it_o be_v wrought_v by_o that_o second_o way_n of_o division_n which_o i_o show_v in_o chapter_n 7_o it_o will_v stand_v as_o follow_v square_a root_n caution_n if_o at_o any_o time_n you_o look_v for_o the_o remainder_n upon_o your_o rod_n and_o you_o can_v find_v it_o there_o you_o must_v then_o place_v a_o cypher_n between_o the_o line_n and_o proceed_v to_o the_o next_o figure_n as_o by_o try_v this_o other_o example_n which_o i_o have_v insert_v for_o practice_n will_v appear_v another_o example_n add_v for_o practice_n chap._n x._o concern_v the_o extraction_n of_o the_o cube_n root_n there_o be_v somewhat_o more_o difficulty_n in_o extract_v of_o the_o cube_n then_o of_o the_o square_a root_n wherefore_o before_o i_o come_v to_o example_n i_o will_v deliver_v the_o manner_n of_o the_o operation_n together_o with_o such_o caution_n as_o be_v to_o be_v observe_v in_o the_o performance_n thereof_o all_o which_o immediate_o follow_v in_o this_o general_z rule_n write_v down_o the_o number_n who_o cube_n root_n you_o be_v to_o extract_n and_o under_o the_o first_o figure_n towards_o the_o right_a hand_n make_v a_o prick_n or_o point_n and_o so_o under_o every_o three_o figure_n towards_o the_o left_a hand_n till_o you_o come_v to_o the_o end_n of_o your_o number_n under_o these_o prick_n draw_v two_o parallel_n line_n as_o you_o do_v in_o extract_v the_o square_a root_n between_o which_o line_n you_o be_v to_o place_v the_o figure_n of_o your_o root_n as_o you_o find_v they_o then_o beginning_n at_o the_o figure_n or_o figure_n of_o the_o left_a hand_n prick_v and_o go_v forward_o towards_o the_o right_a hand_n extract_v by_o help_n of_o the_o rod_n for_o extract_v tract_v the_o cube_n root_n their_o root_n or_o if_o the_o true_a number_n be_v not_o on_o the_o plate_n than_o the_o near_a less_o and_o place_v this_o root_n which_o never_o exceed_v one_o figure_n between_o the_o line_n and_o under_o its_o point_n and_o take_v its_o cube_n from_o the_o uppermost_a figure_n which_o stand_v before_o or_o leftwards_o of_o the_o first_o point_n and_o note_v the_o remainder_n above_o second_o keep_v the_o triple_a of_o this_o root_n sound_n in_o the_o head_n or_o top_n of_o the_o rod_n and_o triple_a the_o square_n of_o the_o same_o root_n and_o set_v this_o triple_a on_o the_o head_n of_o the_o rod_n and_o apply_v it_o leftwards_o of_o the_o cubick_a rod_n and_o the_o reserve_a rod_n or_o rod_n right-ward_n the_o cubick_a rod_n be_v in_o the_o midst_n between_o they_o and_o out_o of_o the_o left_a hand_n rod_n and_o the_o cubick_a rod_n together_o pick_z or_o find_v out_o the_o multiple_n or_o next_z less_o number_n than_o the_o figure_n precede_v the_o second_o point_n which_o write_v apart_o in_o a_o pater_fw-la and_o note_v its_o quotume_n over_o its_o utmost_a right-hand_a figure_n and_o write_v the_o square_n of_o that_o quotume_n left-ward_n from_o the_o quotume_n itself_o even_o in_o that_o order_n as_o you_o find_v they_o in_o your_o cubick_a rod_n and_o under_o every_o several_a figure_n of_o this_o square_a write_v their_o multiple_n find_v right-ward_n even_o such_o as_o the_o figure_n themselves_o do_v show_v so_o that_o every_o multiple_n may_v end_v under_o its_o figure_n or_o quotume_n then_o add_v together_o these_o multiple_n crosswise_o and_o take_v their_o sum_n from_o the_o figure_n forego_v the_o second_o point_n and_o write_v the_o remainder_n over_o they_o but_o write_v the_o right-hand_a quotume_n before_o note_v under_o the_o second_o point_n between_o the_o line_n for_o the_o second_o figure_n or_o quotume_n of_o the_o root_n and_o so_o be_v perform_v the_o operation_n of_o the_o second_o point_n which_o you_o must_v repeat_v through_o the_o several_a point_n even_o to_o the_o last_o but_o in_o the_o practice_n by_o this_o rule_n you_o may_v sometime_o be_v at_o a_o stand_n wherefore_o to_o this_o general_z rule_v that_o there_o may_v be_v no_o obstacle_n i_o will_v add_v these_o two_o calltion_n 1._o caution_n but_o in_o all_o operation_n and_o point_n it_o must_v be_v observe_v that_o if_o no_o