<html> <p>After the completion of grade 7 maths, we carry on to grade 8 work. Learners will see that the work doesn't differ that much, only that the work gets more, and more difficult. </p> <p><img src="https://imgoat.com/uploads/3c65c29742/107508.png" width="343" height="197"/></p> <p><a href="data:image/jpeg;base64,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">Image source</a></p> <p>Starting off with problem solving, in grade 7, learners learnt about steps involved in problem solving. </p> <h3>Revision of what was done in grade 7:</h3> <ol> <li><strong>Understand the problem (What do you know? What do you need to find out?)</strong></li> <li><strong>Develop a plan: Have you solved a similar problem? </strong></li> <li><strong>Solve the problem (Do you need to try any other strategies? What is the solution?)</strong></li> <li><strong>Look back (Did you answer the question correctly? Is the answer you gave, reasonable?)</strong></li> </ol> <p><br></p> <h2>Example:</h2> <p><img src="https://previews.123rf.com/images/cteconsulting/cteconsulting1108/cteconsulting110800032/10205049-an-image-of-a-family-driving-in-their-car-with-luggage-on-top-.jpg" width="1300" height="1300"/></p> <p><a href="https://previews.123rf.com/images/cteconsulting/cteconsulting1108/cteconsulting110800032/10205049-an-image-of-a-family-driving-in-their-car-with-luggage-on-top-.jpg">Image source</a></p> <p>The Peters family is driving from one city to another . The distance between the 2 cities is 600km. The Peters family have been driving for 3 hours at 100km/h. If they increase the speed to 120km/h, how much longer will it take them to reach their destination?</p> <p><br></p> <h3>Using the steps to do the example above:</h3> <p><br></p> <h3>1. Understand the problem:</h3> <p>We know that the Peters' family has completed a part of their journey already. We need to find out how long the rest of their trip will take.</p> <p><img src="https://image.slidesharecdn.com/problemanalysismethods-130322083036-phpapp01/95/how-can-we-understand-the-problem-1-638.jpg?cb=1414917027" width="638" height="359"/></p> <p><a href="https://image.slidesharecdn.com/problemanalysismethods-130322083036-phpapp01/95/how-can-we-understand-the-problem-1-638.jpg?cb=1414917027">Understand the problem</a></p> <h3>2. Develop a plan:</h3> <p>Recall the formulae for distance(d), speed(s) and time(t), as the example is about speed, distance and time.</p> <p>After 3 hours the Peters' family already drove 3 x 100km= 300km.</p> <p>The total distance of their trip is 600km. We can subtract the distance they drove with the total distance. </p> <p>Therefore: 600 - 300 = 300km which they still have to drive.</p> <p>We also know that after 300km they increased their speed to 120km/h so this mean that they will drive the rest of their trip a bit faster.</p> <p><img src="https://innovateuk.blog.gov.uk/wp-content/uploads/sites/153/2017/07/Problem-solving-620-620x397.jpg" width="620" height="397"/></p> <p><a href="https://innovateuk.blog.gov.uk/wp-content/uploads/sites/153/2017/07/Problem-solving-620-620x397.jpg">Think of a plan</a></p> <h3>3. Solve the problem</h3> <p>Draw a picture of the situation to help you solve the problem</p> <p><img src="https://imgoat.com/uploads/3c65c29742/107507.png" width="431" height="173"/></p> <p>After 3 hours, at a speed of 100km/h they drove 300km. They still have another 300 km to go, but for this 300km they are driving at a speed of 120km/h. The time taken for this part of the journey is 300 km รท 120km/h which is equal to 2hours and 30 minutes. The distance they still have to travel is 300 km and it will take them 2 and a half hours to reach their destination.</p> <p><img src="http://www.ixdots.com/wp-content/uploads/2017/06/Blogging-challenge-solve-readers-problems.jpg"/></p> <p><a href="http://www.ixdots.com/wp-content/uploads/2017/06/Blogging-challenge-solve-readers-problems.jpg">Solve the problem</a></p> <h3>4. Look back</h3> <p>Does the answer make sense to you? Yes, if they travelled at a speed of 100km/h and it took them 3 hours, obviously driving at a faster speed must get them at their destination faster. The distance that they have travelled and still have to travel is the same.</p> <p><br></p> <h1>Problem solving is a part of our lives, everyday. </h1> <h1> <img src="https://imgoat.com/uploads/3c65c29742/107509.gif" width="589" height="100"/></h1> <p><br></p> <p><br></p> </html>
| author | apteacher |
|---|---|
| permlink | problem-solving-mathematics |
| category | mathematics |
| json_metadata | {"tags":["mathematics","maths","steemiteducation","education","teamsouthafrica"],"image":["https://imgoat.com/uploads/3c65c29742/107508.png","https://previews.123rf.com/images/cteconsulting/cteconsulting1108/cteconsulting110800032/10205049-an-image-of-a-family-driving-in-their-car-with-luggage-on-top-.jpg","https://image.slidesharecdn.com/problemanalysismethods-130322083036-phpapp01/95/how-can-we-understand-the-problem-1-638.jpg?cb=1414917027","https://innovateuk.blog.gov.uk/wp-content/uploads/sites/153/2017/07/Problem-solving-620-620x397.jpg","https://imgoat.com/uploads/3c65c29742/107507.png","http://www.ixdots.com/wp-content/uploads/2017/06/Blogging-challenge-solve-readers-problems.jpg","https://imgoat.com/uploads/3c65c29742/107509.gif"],"links":["data:image/jpeg;base64,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","https://previews.123rf.com/images/cteconsulting/cteconsulting1108/cteconsulting110800032/10205049-an-image-of-a-family-driving-in-their-car-with-luggage-on-top-.jpg","https://image.slidesharecdn.com/problemanalysismethods-130322083036-phpapp01/95/how-can-we-understand-the-problem-1-638.jpg?cb=1414917027","https://innovateuk.blog.gov.uk/wp-content/uploads/sites/153/2017/07/Problem-solving-620-620x397.jpg","http://www.ixdots.com/wp-content/uploads/2017/06/Blogging-challenge-solve-readers-problems.jpg"],"app":"steemit/0.1","format":"html"} |
| created | 2018-04-25 10:42:06 |
| last_update | 2018-04-25 10:42:06 |
| depth | 0 |
| children | 4 |
| last_payout | 2018-05-02 10:42:06 |
| cashout_time | 1969-12-31 23:59:59 |
| total_payout_value | 17.164 HBD |
| curator_payout_value | 5.086 HBD |
| pending_payout_value | 0.000 HBD |
| promoted | 0.000 HBD |
| body_length | 19,011 |
| author_reputation | 4,822,152,152,859 |
| root_title | "Problem solving - Mathematics" |
| beneficiaries | [] |
| max_accepted_payout | 1,000,000.000 HBD |
| percent_hbd | 10,000 |
| post_id | 52,041,193 |
| net_rshares | 3,450,033,460,839 |
| author_curate_reward | "" |
| voter | weight | wgt% | rshares | pct | time |
|---|---|---|---|---|---|
| team | 0 | 82,089,982,964 | 10% | ||
| kevinwong | 0 | 38,418,379,068 | 0.52% | ||
| ninjace | 0 | 4,323,147,930 | 50% | ||
| shortcut | 0 | 37,588,990,310 | 15% | ||
| azizbd | 0 | 3,129,825,752 | 3.5% | ||
| alishi | 0 | 5,543,142,141 | 20% | ||
| bigbear | 0 | 15,258,574,004 | 25% | ||
| sweetpea | 0 | 13,618,348,661 | 50% | ||
| doodleman | 0 | 930,326,604 | 17.5% | ||
| hopehuggs | 0 | 27,601,435,728 | 10.5% | ||
| heymattsokol | 0 | 3,738,881,928 | 10.5% | ||
| cpol | 0 | 1,710,727,765 | 100% | ||
| paolobeneforti | 0 | 36,627,632,540 | 10.5% | ||
| steemiteducation | 0 | 312,448,830,193 | 35% | ||
| fataelrumy | 0 | 4,451,132,490 | 17.5% | ||
| fingersik | 0 | 2,658,075,645 | 3.5% | ||
| erb | 0 | 3,008,393,877 | 7% | ||
| teachblogger | 0 | 2,027,462,960 | 10.5% | ||
| kenan1989 | 0 | 6,776,654,729 | 35% | ||
| bdmomuae | 0 | 81,434,676,491 | 100% | ||
| eurogee | 0 | 872,144,478 | 3.5% | ||
| dbzfan4awhile | 0 | 4,108,095,025 | 5.25% | ||
| gmaktub | 0 | 397,324,378 | 8.75% | ||
| luvabi | 0 | 2,560,881,487 | 8.75% | ||
| bitrocker2020 | 0 | 1,311,490,780 | 1.75% | ||
| cindycam | 0 | 897,717,066 | 8.75% | ||
| deisip67 | 0 | 963,071,933 | 8.75% | ||
| schoolforsdg4 | 0 | 4,926,840,038 | 7% | ||
| monomyth | 0 | 1,479,279,340 | 1.75% | ||
| kemal13 | 0 | 5,517,041,474 | 30% | ||
| roseri | 0 | 539,144,158 | 17.5% | ||
| bearone | 0 | 4,049,144,898 | 3.5% | ||
| reddragonfly | 0 | 2,605,262,141 | 7% | ||
| howtostartablog | 0 | 1,264,725,095 | 2.8% | ||
| lasocia | 0 | 168,670,530 | 17.5% | ||
| walkinharmony | 0 | 189,201,982 | 0.1% | ||
| ghostgtr | 0 | 1,504,654,618 | 7% | ||
| faluthi01 | 0 | 240,031,482 | 17.5% | ||
| affiedalfayed | 0 | 1,801,631,022 | 17.5% | ||
| coloringiship | 0 | 1,041,463,594 | 3.5% | ||
| dayramsazahara | 0 | 82,848,283 | 17.5% | ||
| appreciator | 0 | 2,147,977,710,007 | 3.48% | ||
| mintvilla | 0 | 18,364,321,963 | 21% | ||
| carmenl | 0 | 140,168,563 | 8.75% | ||
| kofspades | 0 | 99,503,079 | 7% | ||
| martibis | 0 | 207,204,792 | 5.25% | ||
| tanyaschutte | 0 | 1,231,348,951 | 17.5% | ||
| steemitph | 0 | 13,524,002,044 | 10% | ||
| maulida | 0 | 12,345,133,771 | 100% | ||
| samiwhyte | 0 | 485,375,195 | 3.5% | ||
| darmawan | 0 | 64,555,226 | 10.5% | ||
| ashiniki | 0 | 70,335,612 | 100% | ||
| nessyquel | 0 | 1,014,238,940 | 35% | ||
| ponpase | 0 | 185,713,662 | 7% | ||
| massivevibration | 0 | 3,534,727,994 | 5% | ||
| markjason | 0 | 1,089,462,221 | 35% | ||
| masterwu | 0 | 236,755,678 | 7% | ||
| jake770 | 0 | 67,876,546 | 100% | ||
| playitforward | 0 | 10,344,659,262 | 10.5% | ||
| tach | 0 | 2,212,668,763 | 7% | ||
| critic-on | 0 | 6,198,094,887 | 35% | ||
| insemen | 0 | 65,207,561 | 100% | ||
| penauthor | 0 | 109,306,221 | 1.75% | ||
| mrblinddraw | 0 | 15,447,590,365 | 31.5% | ||
| animagic | 0 | 400,527,411 | 35% | ||
| lorax4096 | 0 | 735,017,742 | 100% | ||
| steemlink | 0 | 571,686,408 | 100% | ||
| teo-nyx | 0 | 27,758,382,087 | 32% | ||
| zord189 | 0 | 1,943,703,169 | 3.5% | ||
| sam.hsuu | 0 | 726,224,710 | 3.5% | ||
| jusipassetti | 0 | 1,103,665,119 | 8.75% | ||
| nanastraybutt | 0 | 145,673,316 | 3.5% | ||
| jose27117 | 0 | 154,358,885 | 10.5% | ||
| notimetospace | 0 | 479,905,765 | 3.5% | ||
| hectorzs | 0 | 373,492,805 | 100% | ||
| jaff8 | 0 | 5,977,910,509 | 7% | ||
| halleyleow | 0 | 387,081,077 | 17.5% | ||
| spectrums | 0 | 619,838,949 | 35% | ||
| cheneats | 0 | 122,537,714 | 6.15% | ||
| nairadaddy | 0 | 581,644,358 | 1.75% | ||
| agrojaya | 0 | 857,659,710 | 17.5% | ||
| jeffbernst | 0 | 1,453,220,929 | 7% | ||
| blinks | 0 | 755,090,530 | 35% | ||
| asyrafahamed | 0 | 436,363,581 | 10.5% | ||
| imnotasenuelo | 0 | 82,829,392 | 17.5% | ||
| siren87 | 0 | 133,823,917 | 10.5% | ||
| numero | 0 | 458,964,135 | 100% | ||
| crypto3d | 0 | 1,234,989,531 | 3.5% | ||
| adamzi | 0 | 68,145,746 | 5.25% | ||
| mashiliyanage | 0 | 391,475,594 | 17.5% | ||
| ehf | 0 | 50,176,591 | 7% | ||
| sndbox-alpha | 0 | 443,731,883,310 | 35% | ||
| kaeo | 0 | 204,888,681 | 35% | ||
| rinbird | 0 | 205,762,401 | 35% | ||
| eightbitfiction | 0 | 76,626,862 | 17.5% | ||
| rheyss08 | 0 | 82,846,360 | 17.5% | ||
| bulent1976 | 0 | 131,861,556 | 17.5% | ||
| srimulyani | 0 | 54,893,942 | 17.5% | ||
| carloniere | 0 | 96,492,221 | 35% | ||
| muzzlealem | 0 | 85,557,912 | 17.5% | ||
| broncofan99 | 0 | 1,543,356,919 | 10% | ||
| saracampero | 0 | 51,983,602 | 35% | ||
| apteacher | 0 | 436,917,816 | 7% | ||
| drawmeaship | 0 | 196,349,402 | 35% | ||
| doodlebl | 0 | 76,993,699 | 17.5% | ||
| pharao20 | 0 | 55,002,295 | 17.5% | ||
| pinkyangel | 0 | 76,407,296 | 17.5% |
Hello dear @apteacher, I think that mathematics are fundamental for the intellectual development of children, very well explained today's topic, congratulations. May God fill you with blessings and abundance. #### Regards...
| author | saracampero |
|---|---|
| permlink | re-apteacher-problem-solving-mathematics-20180425t230754242z |
| category | mathematics |
| json_metadata | {"tags":["mathematics"],"users":["apteacher"],"app":"steemit/0.1"} |
| created | 2018-04-25 22:29:03 |
| last_update | 2018-04-25 22:29:03 |
| depth | 1 |
| children | 1 |
| last_payout | 2018-05-02 22:29:03 |
| cashout_time | 1969-12-31 23:59:59 |
| total_payout_value | 0.026 HBD |
| curator_payout_value | 0.007 HBD |
| pending_payout_value | 0.000 HBD |
| promoted | 0.000 HBD |
| body_length | 226 |
| author_reputation | 202,123,147,213,699 |
| root_title | "Problem solving - Mathematics" |
| beneficiaries | [] |
| max_accepted_payout | 1,000,000.000 HBD |
| percent_hbd | 10,000 |
| post_id | 52,143,581 |
| net_rshares | 5,882,192,019 |
| author_curate_reward | "" |
| voter | weight | wgt% | rshares | pct | time |
|---|---|---|---|---|---|
| apteacher | 0 | 5,882,192,019 | 100% |
Thank you for the comment.
| author | apteacher |
|---|---|
| permlink | re-saracampero-re-apteacher-problem-solving-mathematics-20180426t085737509z |
| category | mathematics |
| json_metadata | {"tags":["mathematics"],"app":"steemit/0.1"} |
| created | 2018-04-26 08:57:39 |
| last_update | 2018-04-26 08:57:39 |
| depth | 2 |
| children | 0 |
| last_payout | 2018-05-03 08:57:39 |
| cashout_time | 1969-12-31 23:59:59 |
| total_payout_value | 0.000 HBD |
| curator_payout_value | 0.000 HBD |
| pending_payout_value | 0.000 HBD |
| promoted | 0.000 HBD |
| body_length | 26 |
| author_reputation | 4,822,152,152,859 |
| root_title | "Problem solving - Mathematics" |
| beneficiaries | [] |
| max_accepted_payout | 1,000,000.000 HBD |
| percent_hbd | 10,000 |
| post_id | 52,222,076 |
| net_rshares | 0 |
#### You have been upvoted by the @sndbox-alpha! Our curation team is currently formed by @jeffbernst, @bitrocker2020, @jrswab & @teachblogger . We are seeking posts of the highest quality and we deem your endeavour as one of them. If you want to get to know more, feel free to check our blog.
| author | sndbox-alpha |
|---|---|
| permlink | re-apteacher-problem-solving-mathematics-20180426t024841387z |
| category | mathematics |
| json_metadata | {"tags":["mathematics"],"users":["sndbox-alpha","jeffbernst","bitrocker2020","jrswab","teachblogger"],"app":"steemit/0.1"} |
| created | 2018-04-26 02:48:42 |
| last_update | 2018-04-26 02:48:42 |
| depth | 1 |
| children | 0 |
| last_payout | 2018-05-03 02:48:42 |
| cashout_time | 1969-12-31 23:59:59 |
| total_payout_value | 0.000 HBD |
| curator_payout_value | 0.000 HBD |
| pending_payout_value | 0.000 HBD |
| promoted | 0.000 HBD |
| body_length | 294 |
| author_reputation | 10,434,464,255,786 |
| root_title | "Problem solving - Mathematics" |
| beneficiaries | [] |
| max_accepted_payout | 1,000,000.000 HBD |
| percent_hbd | 10,000 |
| post_id | 52,174,411 |
| net_rshares | 0 |
https://imgoat.com/uploads/97da629b09/106964.png
| author | steemiteducation |
|---|---|
| permlink | re-apteacher-problem-solving-mathematics-20180425t145704756z |
| category | mathematics |
| json_metadata | {"tags":["mathematics"],"image":["https://imgoat.com/uploads/97da629b09/106964.png"],"app":"steemit/0.1"} |
| created | 2018-04-25 14:57:06 |
| last_update | 2018-04-25 14:57:06 |
| depth | 1 |
| children | 0 |
| last_payout | 2018-05-02 14:57:06 |
| cashout_time | 1969-12-31 23:59:59 |
| total_payout_value | 0.000 HBD |
| curator_payout_value | 0.000 HBD |
| pending_payout_value | 0.000 HBD |
| promoted | 0.000 HBD |
| body_length | 48 |
| author_reputation | 221,384,687,159,663 |
| root_title | "Problem solving - Mathematics" |
| beneficiaries | [] |
| max_accepted_payout | 1,000,000.000 HBD |
| percent_hbd | 10,000 |
| post_id | 52,080,798 |
| net_rshares | 0 |
hiveblocks