VẬT LÝ THPT - TUYỂN TẬP NHỮNG BÀI TOÁN VẬT LÝ VỀ ĐIỆN HAY VÀ KHÓ

... =J>∆78$N@F(C&* @FH$α(&&1CNGH TUYỂN TẬP HÌNH HỌC GIẢI TÍCH TRONG KHÔNG GIAN (ĐÁP ÁN CHI TIẾT) BIÊN SOẠN: LƯU HUY THƯỞNG Toàn bộ tài liệu của ... Đối với dạng này, chúng ta không tìm được vec-tơ pháp tuyến của mặt phẳng dưới dạng trực tiếp. Chính vì vậy, ta phải dùng phương trình tổng quát của mặt phẳng để viết. Giải :.$M(h( ... YD7&;78WCFGABC∆jB3jABC∆ Giải J>$(2G@P1( ) ( ) : 2 1 0P d P x y z⇒ ⊥ ⇒ + − + =   GV.Lưu Huy Thưởng 0968.393.899 BỂ HỌC VÔ BỜ - CHUYÊN CẦN SẼ ĐẾN...

... LUÂN GIẢI TÍCH TỔ HPLOẠI TOÁN ĐẾM Bài 1: Với các chữ số 1,2,3 có thể lập được bao nhiêu số nguyên dương khác nhau có tính chất:1. Mỗi số gồm 3 chữ số trong đó chữ số 1 là chữ số duy nhất lập ... này là 1000x10 + 100x10 + 10x10 +1x10 = 11110 Vậy tổng của các số phải tìm là: .A49111102.Trang 2 HUỲNH THANH LUÂN GIẢI TÍCH TỔ HP( ) 3 212 222 2 3 11 22132 21 235511, ... BPT,…:Lưu ý: Đặt đk, dùng các công thức, khử giai thừa, giải pt, bpt,…Vì giải trong tập hợp số tự nhiên nên có thể thử nghiệm nếu cần.( ) 3 22 4 2 3 41 4 1 13 38 66 5112 2 24 5 64311212...

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... BÀI T P ÔN T P HAY VÀ KHÓ TRONG CH NG TRÌNH V T LÝ 10 Ậ ƯƠ Ậ Bài 1.8. M t chi c xu ng máy ch y trên m t đo n sông có b sông song song v i dòng ch y.ộ ế ồ ạ ộ ạ ờ ớ ả Xác đ nh v t m c và ... S1 = 3S2 hay a + x = 2 2h x+2 2 2 2 2 2( ) 9( ) 8 2ax+9h 0a x h x x a⇔ + = + ⇔ − − = thay s vào ta có:ố8x2 -100 15-6.502 = 0 ph ng trình có 2 nghi m: xươ ệ1 = 73,8(m), và x2 = ... ề : 5t + t2 = 75 + 20t – t2gi i ra ta có t = 10s và t = - 2,5s ( lo i). v i t = 10s thì x = 150mả ạ ớV y sau 10s thì xe 1 đu i k p xe 2 và ví trí g p nhau cách A đo n 150mậ ổ ị ặ ạ+ Khi...

... mà khi chia cho 2; 3; 4; 5; 6 có số d lần lợt là 1; 2; 3; 4; 5? 9. Tìm số tự nhiên x117336=+ x10. Tính bằng cách thuận tiện nhất:196743317 5 52419968 5 37726 ++++++++11. ... 112. Tính bằng cách thuận tiện:( 792,81 ì0, 25 + 792,81ì0, 75) ì (11 ì9 900 ì0,1 9)13. Tìm số hạng đầu tiên của dÃy số: , , ,47, 52 , 57 biết rằng mỗi dÃy đều có 10 số hạng. 14. Tính ... nhất:1006200612610001 252 006ì+ì 256 11281641161814121++++++34. Tính giá trị của biểu thức sau : 2007200720820092009200820082008200820092009ììììì 35. Tính (1000)1,0901,09001,0 ìììì(142 ) 25, 024 05, 0...

... cuc sng khoa hc có th hay không th tìm vàng trong cát. Trong mt bài báo công b vào tháng ti trên tp san Historical Studies in the Natural 19 Tuyn Physics World 2008 | â hiepkhachquay ... kì tác nhân lí, hóa hay sinh hc nào làm thay i d, n hay tng s vân cha trong lp chiu dày màng s làm phát sinh nhng bin i quan sát ưc  bưc sóng (màu sc) hay cưng  ( sáng) ... có mt, cho dù chúng là nhng ngôi sao già. Nhà vt lí Freeman Dyson là ngưi trong mt bài báo năm 1960 ã mô t cách thc nhng nn văn minh tiên tin ngoài a cu có th thc thi nhng...

... Ví dụ 1: CMR: 36n - 26n  35 Với  n  N Giải Ta có 36n - 26n = (3 6 )n - (2 6 )n = (3 6 - 2 6 )M = (33 + 23) (33 - 23)M = 35.19M  35 Vậy 36n - 26n  35 Với  n ...  6 Ví dụ 2: Cho a, b  z thoả mãn (16a +17b) (17a +16b)  11 CMR: (16a +17b) (17a +16b)  121 Giải Có 11 số nguyên tố mà (16a +17b) (17a +16b)  11 http://baigiangtoanhoc.com Tuyển tập ... http://baigiangtoanhoc.com Tuyển tập chuyên đề toán 6 Trung tâm gia sư VIP – http://giasuvip.net Hotline: 0989189380 = 16. 16 k - 15k - 16 = ( 16 k - 15k - 1) + 15. 16 k - 15 = 16 k - 15k - 1 + 15.15m...

... ? 123 + 456 = …… 347 + 4 52 = …… 125 + 671 = …… 25 7 + 411 = ….745 – 123 = ……. 333 – 21 3 = ……. 745 – 24 5 = ……. 468 – 4 12 = … 546 – 123 + 23 = ………. 456 + 111 – 22 2 = …… 5 x 3 + 15 = …… 2. Đổi ... là:a. 27 b. 27 cm c. 37 cmII. TỰ LUẬN:( 7 đ) Bài 1: Đặt Tính rồi Tính: ( 2 ) 100 – 43 37 + 48 459 – 25 423 + 20 2 Bài 2: Điền dấu <, >, = vào chỗ chấm: ( 1đ)7mm + 3mm ……1cm 2 km……… 2m Bài ... ABDCNPMQACREBQPDONc) x + 26 = 12 + 17 d ) 34 + x = 86 – 21 Bài 7 : Tìm x biết a) x – 17 = 23 b ) x – 15 = 21 + 49 c) x – 34 = 67 – 49 Bài 8 : Tìm x biết a) 17 – x = 12 b) 72 + 12 – x = 48 c) 28 + 26 – x =...

... TUYỂN CHỌN MỘT SỐ BÀI TOÁN NÂNG CAO LỚP 7 A.PHẦN ĐẠI SỐ: Bài toán 1. So sánh: 202009 và 1020092009. Bài toán 2. Tính tỉ số BA, biết: 2008120 07 2 32006220 07 12008200912008120 07 1 ... 31220822−+−+−xxxxx Bài toán 16. Trong 3 số x, y, z có 1 số dương, 1 số âm và một số 0. Hỏi mỗi số đó thuộc loại nào biết : zyyx23−= Bài toán 17. Tìm hai chữ số tận cùng của tổng sau ... = 4 Bài toán 21. Cho a là số gồm 2n chữ số 1, b là số gồm n + 1 chữ số 1, c là số gồm n chữ số 6. Chứng minh rằng a + b + c + 8 là số chính phương. Bài toán 22. Chứng minh rằng với mọi số tự...

... cách là 15cm ( tức 1 góc vuông ). Ta có:[ ( X x 5 ) + 45 ] - 60 x X = 15 ( cm ) ==> 5X + 45 – 60X = 15 ==> 45 – 55 X = 15 ==> 45 – 15 = 55 X ==> 30 = 55 X ==> X = 30 /55 = 6/11 ... 1/128 + 1/ 256 + 1 /51 2 = 256 /51 2 + 128 /51 2 + 64 /51 2 + 32 /51 2 + 16 /51 2 + 8 /51 2 + 4 /51 2 + 2 /51 2 + 1 /51 2 = 51 1 /51 2Đáp số: 51 1 /51 2*BÀI SỐ 116:Tìm một phân số biết phân số đó có giá trị bằng 3 /5 và biết ... 1980 = 1 75. Tích đúng là: 2009a = 2009 x 1 75 = 351 5 75 ĐS: 351 5 75 BÀI SỐ 95: Tính diện tích hình tròn biết nếu bán kính hình tròn tăng thêm 20% thì diện tích hình tròn tăng thêm 56 ,54 cm2.Bài...

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...

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... www.daihocsuphamtphcm.edu.vnCÁC BÀI TOÁN ĐIỆN HAY Câu 1: Một tụ điện C có điện dung thay đổi, nối tiếp với điện trở R =Ω310 và cuộn dây thuần cảm có độ tự cảm )(/2,0 HLπ=trong mạch điện xoay chiều có ... điện có điện dung C thay đổi được trong mạch điện xoay chiều có điện áp )(cos0VtUuω=. Ban đầu dung kháng ZC và tổng trở ZLr của cuộn dây và Z của toàn mạch đều bằng 100Ω. Tăng điện ... =Câu 7: Cho mạch điện RLC, tụ điện có điện dung C thay đổi. Điều chỉnh điện dung sao cho điện áp hiệu dụng của tụ đạt giá trị cực đại, khi đó điện áp hiệu dụng trên R là 75 V. Khi điện áp tức thời...