Kia mōhio te ākonga ki te:
He Tūhuratanga Tauira Tau WT1
tauira tau
|
number pattern
|
raupapatanga tau
|
number sequence
|
hauroki
|
diagonal
|
tauira tāruarua
|
repeating pattern
|
hohoko
|
alternating
|
pou
|
column
|
kapa
|
row
|
tīpako
|
select
|
tapeke
|
total
|
Ngā tohutohuKo tāu mahi, he tuhi raupapatanga tau. Whakaarohia tētahi ‘tau tīmatatanga’ me tētahi ‘tau peke’, hei whakaputa i tō raupapatanga tau. Hei tauira: Me āta kimi ngā tauira huhua kei roto i tēnei raupapatanga tau. Me tuhi ia tauira, ka whakamārama ai. |
Anei ētahi o ngā tauira e kitea ana i te tauira tau i runga ake nei:
3 | 8 | 13 | 18 | 23 | 28 | 33 | 38 | 43 | … |
taukehe | taurua | taukehe | taurua | taukehe | taurua | taukehe | taurua | taukehe | … |
3 | 8 | 13 | 18 | 23 | 28 | 33 | 38 | 43 | … |
ngahuru-kore | ngahuru-tahi | ngahuru-rua | ngahuru-toru | ngahuru-whā |
3 | 8 |
13 | 18 |
23 | 28 |
33 | 38 |
Ngā tohutohuTīpakona tētahi tapawhā rite (2 x 2) i te papa whakarea (He Tūhuratanga Tauira Tau WT1 PDF, 73KB). Tāpirihia ngā tau e noho hauroki ana. Whiriwhiria te rahinga ake o tētahi o ngā tapeke i tētahi. Kia pērā anō te whakamātau i ētahi atu tapawhā rite (2 x 2). He aha te tauira e puta ake ana? He aha ki tōu whakaaro i pērā ai? Whakamātauria ētahi tapawhā rite nui ake (pērā i te 3 x 3, te 4 x 4 rānei). |
Koia nei tētahi tapawhā rite (2 x 2) kua tīpakona i te papa whakarea.
15 | 18 |
20 | 24 |
Koia nei te tāpiritanga o ngā tau e noho hauroki ana:
Ngā tohutohuTīpakona tētahi tapawhā rite (4 x 4) i te papa whakarea (He Tūhuratanga Tauira Tau WT1, PDF 73KB). Tāpirihia ngā tau e noho ana ki ngā kokonga. Tāpirihia ngā tau e whā e noho ana ki waenganui o te tapawhā rite. Kia pērā anō te whakamātau i ētahi atu tapawhā rite (4 x 4). He aha te tauira e puta ake ana? He aha ki tōu whakaaro i pērā ai? |
Koia nei tētahi tapawhā rite (4 x 4) kua tīpakona i te papa whakarea.
49 | 56 | 63 | 70 |
56 | 64 | 72 | 80 |
63 | 72 | 81 | 90 |
70 | 80 | 90 | 100 |
Te tāpiritanga o ngā tau e noho ana ki ngā kokonga:
49 + 70 + 70 + 100 = 289
Te Tāpiritanga o ngā tau e noho ana ki waenganui:
64 + 72 + 72 + 81 = 289
Ngā tohutohuTāpirihia ngā tau e whā e noho ana ki ngā kokonga o te papa whakarea (He Tūhuratanga Tauira Tau WT1, PDF 73KB). Tāpirihia ngā tau e whā e noho ana ki te taha whakaroto o aua tau e whā. Tāpirihia ngā tau e whā e noho ana ki te taha whakaroto o aua tau e whā. Kia pērā tonu te tāpiripiri haere i ngā tau. He aha te tauira e puta ake ana? He aha ki tōu whakaaro i pērā ai? |
Koia nei ngā tau e whā e noho ana ki ngā kokonga:
Koia nei ngā tau e noho whakaroto ana i aua tau e whā.
Tīpakona tētahi tau.
Tāpirihia taua tau ki a ia anō.
Whakapikia te tau mā te kotahi, whakahekea te tau mā te kotahi, ka tāpiri ai.
Kia pērā anō mō ētahi atu tau.
He aha te tauira e puta ake ana? He aha ki tōu whakaaro i pērā ai?
He aha te tauira ka puta ake mēnā ka whakareatia ngā tau?
Ka tīpakona te 15:
Tāpiritanga:
15 + 15 = 30
16 + 14 = 30
Whakareatanga:
15 x 15 = 225
16 x 14 = 224
Printed from https://nzmaths.co.nz/resource/he-tuhuratanga-tauira-tau at 4:19pm on the 1st July 2024