<question> [3] When a wave sequence reaches ______ ______ ______, set TAF trading mind. If not, just endure. <img data-image_id="2971a4ff-fb9f-4f8d-83c0-a1d7d3f8740c" 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" > </question> preceding swing start <question> [3] When wave 2 has retraced to (a)____ of wave 1, enter the market. Put in place a stoploss order at just below (b)____. <img data-image_id="46369e04-e2ca-42b0-8ad7-71010b8a0265" src="data:image/jpeg;base64,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" > </question> <answer> (a) 61.8% (not 38.2%) (b) Point 0 ** 3rd wave are generally the most powerful phase in any five wave sequence </answer> [3] After stop-loss order is taken, sell ___ units. <answer> Units that are twice as ones for 3 wave trading ** Even a relatively small movement falling below Point 0 should recover any loss incurred on 3rd-wave trading. </answer> <question> [3] The most critical point at 3rd wave is located at ____, the level where the distance from wave 2 end equals wave 1. <img data-image_id="25aad938-d95c-4d92-b350-f4c8b56f321b" src="data:image/jpeg;base64,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" > </question> Point Q [3] If the market falters around (Q), then drops possibly to overlap (1)____ or (2)____. (1) wave i of wave 3 (2) wave 1 end <question> [3A] When the price has exceeded Point (Q), at the level (1)____ of the length of wave 1, some traders enter the market. Call this (2)_____. <img data-image_id="60f22af9-9702-4808-a629-2b4b5fcc5068" 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" > <br/> </question> (1) 100% (2) 3A trading [3] While the price reach Point Q, you have got to (1) ___ ___ ___ carefully if wave 3 will expand and be (2) ___ times as long as wave 1. (1) watch price action (2) 1.62 [3A] If wave 3 extends, as is the case 60 percent, wave 3 is likely to be ___ times the LENGTH of wave 1 or even longer. 2.62 ** Clearly, it is desirable to be very aggressive at this trading. [3] All the trades before and after the ______ are mere trading exercises. These two trades are what it is all about. 3 and 3A trading <question> <img data-image_id="a819952c-a1db-4737-a513-34efe6be24a8" src="data:image/jpeg;base64,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" > [3] When four minor waves take shape from wave 2, project probable end of wave 3 by using ____ to calculate the end-point of wave v of wave 3. </question> Fifth Measurement Method 1 (FMM1) <question> [3A] Measure the distance traveled by wave 1, multiply it by (1)___ and add it to the end of wave 2. This projection is called the (2)____. <img data-image_id="dc2be56c-36d1-45eb-a572-8f559184e17b" 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" > </question> (1) 1.618 (2) Fifth Measurement Method 2 (FMM2) <question> [5] After wave 4 has retraced (1)___ or (2)___ percent of wave 3, enter the market. <img data-image_id="51005bf4-edf5-47ed-a1e4-4ff35b53b44b" 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" ><br/> </question> (1) 38.1 (2) 50 [5] Trade __ units on wave 5 if wave 3 is 1.618 times as long as, or longer than wave 1 3 [5] Trade __ units on wave 5 if wave 3 is less than 1.62 times the length of w1. 5 ** But don't get so aggressive on wave5 in case of failure. Cautious of contrary trading [5] If wave 3 was longer than wave 1, by a ratio of 1.618 or higher, wave 5 is not likely to ____ or to be normal. extend <question> <img data-image_id="85db49ac-a088-46cb-995b-8aed3f65fb98" 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jr6jasusF8ZYWP4+3ADt2TxG/wDXyrTLhRERAREQEREBUWp1K13uj0+OzFHKG1LL2b2h2x2+DDhnsIzyKvVV2PCmh6FZ9+BB9DSIQwxiewGE5Ld4wf5YR2kQuaWunsEF24gvHM+Xs7VZIgrvgmJznPNiyXPGHHeMkeQ8l9waZFBJG9sszuHna1zgQM9vLC7kQZRERBpanesP0bfYplDU71h+jb7Fzx2pH6zapkN4cVeGVpxzJe6QHPm6g/FB3KLiRuldCHtL2tDnNzzAOcEjyHB9RUTbUb781MZ4kMUcriewh5eBjz9Q/guWv4U3/Qq3vzoLRFV1/Cm/6FW9+dUlGlVju6bcZVgbZk1i610wjAe4f7nkXdpHIeoIPacIbqNK+JbJsWdTtQSl1iQtfGzpOxm0nbgbRjly/mruLRKMNxtqNk/EZK+ZrTZkcxr37tzgwu2gne7xeMqCto9aHultai3T6zC+GPhzNjaHcTdLxD5QSHNyfH58K6QVdfwpv+hVvfnXYK8TbclprMSyMbG52Tza0uLRjs7Xu9a5IYpB3RXZSxwjdUrta7HIkPmJAPlGR6wrNAVXX8Kb/oVb351aKrr+FN/0Kt786C0VXX8Kb/oVb351aKrr+FN/0Kt786C0REQEREBERAREQFV2PCmh6FZ9+BWiq7HhTQ9Cs+/AgtEXI65ANQbQEzelOiMwiHbsBA3HyDJA8/PHYVBZ1ihUkmZYn2GFjnyHY4tGG7i3IGN20btv7WOeMc0FkirDrVFkQklkniaXEYlrSRkAYy4hzQQwZGXnqjPMqaC/BNafWaZWzR5y2SF8e4A4JaXAB4BI5tyOY8oQUKIiDS1O9Yfo2+xZXT+6WlZ7urVCOKyJZGNqgua3G+F0znH9rOCDy5epaqp3rD9G32Lhg0TTYNXk1SKpA2zIAC8RtBBy4lwOM7nbyCc8wArNedinpust1etqDr07zcvT05YS2PZwojYMYGG7sgt7c8+eVQ6Prepy/pKmqSWiYHzTVyzhsGY4+KWDOM8iTz7T48rbQ6JpsOryanHUgbZkAG8RNBBy7LgcZ3O3kE55gBZHSu5u9X/SJYvPkrmKKR9ohr3biyUytaMbe0EHPP1rXivHJl3/AI8f1Lv0tKcIbqNK+JbJsWdTtQSl1iQtfGzpOxm0nbgbRjly/muqpp2zukliNyy+vUxeihIZtEkzpw/mG7iOZwM+PxpUoaozUq8MteuKla7PcE7ZyXPEnHw3Zt5EcQZ548meeLCv4U3/AEKt786xVaIiICIiAouHG2V0wY0Pc0Nc7HMgZwCfIMn1lSogKuiglbr9uy5uIZKsEbXcubmvlLhjt7Ht9asVnYO6KS1tjgptNiSURxNM2GNJa95ZK4NJZI1sbtzAHYJbz55AaJFzULUd6hXuRAtjsRNlYHDBAcARnz810oCIiAiIgIiICpb0UkndRpvDnlh2VbDnBgad4D4OqdwPI+bB84V0qux4U0PQrPvwIE1a47ugq22MgNWKvLE8mQh+XuYeTduCBwx4x+0fJzrJNDu2S83m1ZmzONiZjZHsD5TW4DohyJDDzdvzkdm3xrTogy0+hahZrNY+aLP6xgjfO+XgNeGc+I4bpgC0uMbwGu3gHkxqsq9O18OS3bDY2M2ujYGzulLwS3Bw4ARcm82tyHE5P7IKt0QZRERBpanesP0bfYplDU71h+jb7FMgKLhxtldMGND3NDXOxzIGcAnyDJ9ZUqq9ZntVqsD6sjY/95AyTLNxcx8rWuA8h63bz5Z8fMBaLlbVjZfmuDPEmijicD2AMLyMefrn8FVd0d+1SB6LKY+DTs3TgA7zFsww5B6p3nOMHkMELl6db6bfffvy1KxZPJXNZ0Uoijgcxr3OzGTuJ54y7k4ggFoQalFkxZ1mCfT23bLmxRtjNra+IyufNLtjYWhhBa3G0uGzdkkc24WsQEREBERAVCO5yCMRGvbtQyV3M4EjCwmNjGvY2MbmkFoEj+ZBdz5k4CvkQc9SvFUqw1YGbIoWCONuScNAwBk8+wLoREBERAREQEREBVdjwpoehWffgVoqux4U0PQrPvwILRFFxI2ythL2h7mlzW55kDGSB5BkesKKS7UhkfFLahY9kRmex8gBbGOReR4m+fsQdSLhi1XTZYmSRahVfG+QQse2ZpDpD2MBzzd5u1ewajRtWZKte7XlsR54kTJWuezBwcgHIweSChREQaWp3rD9G32KZQ1O9Yfo2+xcUs2siVwhoUHRhx2Ofde0keIkcI4PmyUFmopo2SgNkYHtDg4BwyMggg/xBAI84XBx9e+bdN+8JPyU4+vfNum/eEn5KCeXTaM1hs81Ku+Zj+I2R8TS5r8AbgcZBw1vP/1HkX2aVUusONaAusgNnJYMygDADv8A7DHLn4lWt1HWX35qY03T+JFFHK49PfjDy8DH6nt6h/BdHH175t037wk/JQdklaCSeKeSGN80WeFI5oLo8jB2ntGR24XQqvj69826b94Sfkpx9e+bdN+8JPyUFoiq+Pr3zbpv3hJ+SnH175t037wk/JQWiKr4+vfNum/eEn5KcfXvm3TfvCT8lBaIqNuo6y+/NTGm6fxIoo5XHp78YeXgY/U9vUP4Lo4+vfNum/eEn5KC0RVfH175t037wk/JTj69826b94SfkoLRFV8fXvm3TfvCT8lOPr3zbpv3hJ+SgtEVXx9e+bdN+8JPyU4+vfNum/eEn5KC0RUbdR1l9+amNN0/iRRRyuPT34w8vAx+p7eofwXRx9e+bdN+8JPyUFoqW+LDu6jTTXkjjxVsGTfGXbmb4MgYcMHz88eQqbj69826b94SfkqOvBqcusw3b0FWFkNeWICGw6UuL3RnxsbgDhny9qDyxBJ/qupajpPLBUlhksgsABLmOa089xA2O8RALx5TiqtaXdv8UW6MkbbD3WZRHKwlu6pwDE0k85NxJBI24558S1yIMpJV110la5GZ+NE2aKISmHiYfwy3j46uzcx2eH1tuzHPcrmrXlOpWbtpu0n9TXaSDsjHMnx4LnZJwebWx5AIKskQZRERBpanesP0bfYplSw6sGQsZwM7WgZ39uP5KX4Z/d/6/wDCC1RVXwz+7/1/4T4Z/d/6/wDCDn1ifU2ag6vQe0ul06y+BmwZ4zTGGkudyx1+zkO3OeWJKF5kGm257tm2ehucbHSmx74QGB2P1Q2kbSHcsnrY7eQhnkoW5BYs6XWll2mLfI1rnbDuBbkjOCM8vOV6y1UirdAj06FlUxvBhaAGY55G3GMHJz/FBW0O6G7GyVluGeWzO6KWvFZgfXEYkkbG6HcWdYRl7MvwS7f2cla6frM1/UDUZSLRE3dPLxQWscJJYy0DGXdaLkcDIJJ2kAHl1SapqUQhuUmyAFjskg5G5ry3m09Uljcjx4XVFfgrkcCjHHhrYhsw3DG7treQ7BzwPFkoINRm1Y3tRr0pXuLIqkkTIWRh7WuleJcGTqlxaw4zgdnLPM9VG5LNDBBDM6SSSOcma1s3skjeGFro2bQ4BziCW8uqOfWBXHJJptqSWafR6skk7MSuexrjIBzAcS3mOo3t8g8imdZqbGRHToDGIzA1uBtEZ2gsAx+yeXLs5BBw07upvZpNy3Ztspz1KpdJE2HY6Z5IcHggvAcXRgbBgZPZ2jWLNxyabVkimg0erHJAzETmMa0xg8yGkN5Dru7PKfKu/wCGf3f+v/CDn1ifU2ag6vQe0ul06y+BmwZ4zTGGkudyx1+zkO3OeWJKF5kGm257tm2ehucbHSmx74QGB2P1Q2kbSHcsnrY7eQhnkoW5BYs6XWll2mLfI1rnbDuBbkjOCM8vOV6y1UirdAj06FlUxvBhaAGY55G3GMHJz/FBW0O6G7GyVluGeWzO6KWvFZgfXEYkkbG6HcWdYRl7MvwS7f2cla6frM1/UDUZSLRE3dPLxQWscJJYy0DGXdaLkcDIJJ2kAHl1SapqUQhuUmyAFjskg5G5ry3m09Uljcjx4XVFfgrkcCjHHhrYhsw3DG7treQ7BzwPFkoINRm1Y3tRr0pXuLIqkkTIWRh7WuleJcGTqlxaw4zgdnLPM/M9y7LpkMOnPszWH7i+VzoGzt4c7GyMDSAwkAvG4dUFo5ncCUkmm2pJZp9HqySTsxK57GuMgHMBxLeY6je3yDyKWWShLGyvNpdaSFjeE2N7WlrWcjtAxgDLW8v/AFHkQc0Nq50yvLJc1H4O6kRkLK//AJ+M9j2SgNz+1sZlgx2nP/ZahUAkoRyxWG6XXbNWaIoXhoDo28xtacZAwTyHlXV8M/u/9f8AhBz6xPqbNQdXoPaXS6dZfAzYM8ZpjDSXO5Y6/ZyHbnPLElC8yDTbc92zbPQ3ONjpTY98IDA7H6obSNpDuWT1sdvIQzyULcgsWdLrSy7TFvka1zth3AtyRnBGeXnK9ZaqRVugR6dCyqY3gwtADMc8jbjGDk5/igraHdDdjZKy3DPLZndFLXiswPriMSSNjdDuLOsIy9mX4Jdv7OStdP1ma/qBqMpFoibunl4oLWOEksZaBjLutFyOBkEk7SADy6pNU1KIQ3KTZACx2SQcjc15bzaeqSxuR48LqivwVyOBRjjw1sQ2Ybhjd21vIdg54HiyUF2iqvhn93/r/wAJ8M/u/wDX/hBaoqr4Z/d/6/8ACfDP7v8A1/4QVKIiD//Z" > [5] If wave 3 had been extraordinary strong, and had gained ground very quickly, wave 5 has higher chances of being same as (1)____ or being (2)_____. </question> (1) wave1 (2) failure ** Therefore, being too optimistic on wave 5 is not recommended. <question> <img data-image_id="c5c97154-746c-4910-85e1-2c3c9b93e0de" src="data:image/jpeg;base64,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" > [5] The wave that would be labeled as wave 5 could be actually _____ of an extending wave 3. Taking positions aggressively at this phase is reasonable and desirable. </question> wave iii <question> [5] The ideal stop-loss order for 5th wave trading should be placed just BELOW the level of ____ peak. <img data-image_id="85ca314c-3e60-47a8-8b55-1b6f8d897f71" src="data:image/jpeg;base64,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" > </question> wave1 [5] If the correction which will be labeled as ____ drops <span style="color:#ff0000;">below the peak of wave 1</span>, the premise of a five-wave sequence to Point T is wrong. wave4 <question> [5] The 3rd wave move should be more appropriately classified as ____ when the wave, which could be wave 4, overlaps the top of wave 1. <img data-image_id="609c7d53-ac43-4d4e-805a-5c3dac421099" src="data:image/jpeg;base64,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" > </question> zigzag correction (C) [5] Any retracement (that could have been wave 4, moving beyond/below top of w1) of correction is part of "a large-degree trend" which should move strongly. ____ ____ trade can be very aggressive on an extensive move. Stop-trading (buy-stop or sell-stop trade) [5] If the stop-loss level (1) (___ __ ___) for 5th wave trading is hit, trade up to (2) ___ units, depending on the net position in 3rd wave trading <answer> (1) top of w1 (2) 10 ** Stop trade should be made for<span style="color:#ff0000;"> a short time and length.</span> </answer> [5] If wave 3 was extended (i.e. it is at least 1.618 times as long as wave 1), and wave 4 could be (1)___% retracement or less relative to wave 3, then a stop-loss order may be placed at the level just below ___% of wave 3. <answer> (1) 50 (2) 61.8 ** This stop-loss level will only be effective if the pattern of wave 4 forms sideway correction patterns after w3 extension. </answer> [5] If a correction on wave 4 starts with (1)____ pattern, the likely stop-loss level is (2)___ percent. <answer> (1) sideway (2) 61.8% ** Also bear in mind Principle of Alternation with Wave 2. </answer> [5] If the corrective waves from wave 3 top can be made up as a three rather than a five, _____ becomes a critical level for any rally to new peaks. Point Q (38.2-50% level of wave3) Wave 1 top [5] After the price moves beyond Critical ____ (61.8% level of w4), the probability of further declines diminishes to a negligible degree. Point X [5] On a price move after wave 4, (1)_____, (2)_____ and (3)____ are three critical levels. (1) Point X (2) w3 top (3) w1 top [5] If the market has gone as high as (1)_____ of wave 5, and subsequently declined to the level of (2)_____, sell all positions and stand aside. (1) wave iii (2) Point Y(wave3 top) [5] Project the probable ending point of wave 5 by internal and external wave relationships. The peak of wave v of wave 5 may be calculated by using ____. FMM [5] What has been labeled as wave 5 peak may actually be just _____ of a extended wave 3. wave iii [5] At a certain point, paper-profits definitely have to turned into _____ as a profit. hard cash [A] When wave ii of wave A has retraced 50 to 61.8 percent of wave i, trade 3 units on catching ____ ____. Since the expected decline is a mere correction a-b-c, and the profit potential is limited. Tactics are adjusted accordingly. third trend (of a wave-sequence) <question> [A] Put a stop-loss order just above the level of Point T, If the stop is elected, by (1)____ units. The size of the stake depends on how the length of the previous wave 3. If wave 3 was not (2)_____, trade up to a maximum of units. <img data-image_id="8e3d2ad6-3daa-462a-8621-5d3405f413dd" src="data:image/jpeg;base64,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" > </question> <answer> (1) 6-10 (2) extended ** <span style="color:#ff0000;">Quick and short trade is recommended around critical points</span> </answer> <question> [A] After "a five-wave" sequence from Point T, this 61.8% level of previous wave 5 can be (1)_____. The level is also at the top of previous (2)_____ or (3)___% of previous impulse waves. <img data-image_id="f7949585-1b80-4cf0-9e46-20771d181321" src="data:image/jpeg;base64,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" > </question> (1) Point Z (2) wave 3 (3) 38.2 [A] The bottom of wave 5, and "also ending point of ____" can be calculated by using FMM. At the projected level, wait and see wave B. wave A [A] _____ can be 38.2% level of the move from Point 0 to Point T. Taking some profits at 38.2 percent retracement level is a very logical action. wave A [A] The count of the minor waves sometimes cannot precisely produce _____, (as it often happens in short-term wave schemes), for the reason that the larger-degree wave reaches previous critical levels. a five-wave sequence <question> [C] When wave B has retraced 38.2 to 50 percent of wave A, trade __ more units. <img data-image_id="8b93bf36-284c-4485-a743-426a5052d750" src="data:image/jpeg;base64,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" > </question> 3 [C] Move the stop-loss above the (1)____ percent retracement level of wave A after the price goes (2)____ the end of wave A. If the stop-loss is elected, cover all short position and stand aside. (1) 61.8 (2) BELOW [C] Compute for the likely trough of wave v of wave C using FMM. The target for wave C is often equal of the length of wave __. wave A [Cor.] There is a popular maxim with wave analysts, which should set the tone for this section. "You make money trading the impulse phases, and you ___ it trading the corrections." lose (?) [Cor.] The market spends about ___ percent of the TIME in consolidation, while impulse waves take up the rest. Side-standing during corrections of course mean that the trader will be idle for more than half of time. 70 [Cor.] There are situations where corrective waves can be extremely profitable, as in second waves. It is normal for ____ ____ to retrace 50 percent or more, and also the wave makes full retracement of 100 percent is not unusual. Trade corrective waves with much caution if you require profits. second wave (w2/wB) Do I win? I do WIN