... thi min phớ
Bài tập hoá học THCS Nguyễn Ngọc Anh
7
8,Hũa tan 24,4 gam BaCl
2
.xH
2
O vo 175,6 gam nc to thnh d/ dch 10, 4% . Tỡm x?
9, Cụ cn rt t t 200ml dd CuSO4 0,2M thu ủc 10 g tinh the CuSO4.pH2O ...
http://Onbai.org & http://eBook.here.vn - Download Ti liu thi min phớ
Bài tập hoá học THCS Nguyễn Ngọc Anh
3
Bài tập hoá học dùng cho HS giỏi THCS
I/ viết PT biểu diễn sự chuyển đổi sau: ...
http://Onbai.org & http://eBook.here.vn - Download Ti liu thi min phớ
Bài tập hoá học THCS Nguyễn Ngọc Anh
10
8, Hũa tan hon ton 27,4 gam hn hp gm M
2
CO
3
v MHCO
3
( M l kim loi kim...
... <E
m
)? 108
Chủ đề 3. Tìm bước sóng của các vạch quang phổ khi biết các bước sóng của các
vạchlâncận? 108
Chủ đề 4. Xác định bước sóng cực đại (λ
max
) và cực tiểu (λ
min
) của các dãy Lyman,
Banme,Pasen? ... 58
Th.s Trần AnhTrung 6 Luyện thi đại học
Phương pháp giải toán Vật Lý 12 Trường THPT - Phong Điền
PHẦN 11
PHƯƠNG PHÁP GIẢI TOÁN VỀ MẮT
VÀ CÁC DỤNG CỤ QUANG HỌC BỔ TRỢ CHO MẮT
CHỦ ĐỀ 1.Máy ảnh: ... lượng E
1
)? 109
Phần17 . PHƯƠNG PHÁP GIẢI TOÁN VỀ PHÓNG XẠ VÀ PHẢN ỨNG HẠT
NHÂN 110
Chủ đề 1. Chất phóng xạ
A
Z
X có số khối A: tìm số nguyên tử ( hạt) có trong m(g)
hạtnhânđó? 110
Chủ đề 2....
... 4π.NB
2
⇒
2
22
10
10
1
−
=
=
=
NB
NA
S
S
B
A
.Vậy I
B
= 10
-2
.10
-3
=10
-5
W/m
2
.
Mức cường độ âm tại B : L
B
= 10. lg
7
12
5
0
10lg10
10
10
lg10 ==
−
−
I
I
B
... 5 : Hiện tượng cộng hưởng âm. 10
C .Bài tập áp dụng 10
Dạng 6 : Hiệu ứng Đốp-ple. 12
a. Kiến thức cần nhớ 12
b. Bàitập áp dụng 13
VI: Bàitập tổng hợp 14
Biên tập nội dung: Đỗ Xuân Nhạ ( C ... B.Phương pháp giải bàitập 9
Dạng 1 : Cường độ âm tại một điểm. 9
Dạng 2 : Mức cường độ âm 9
Dạng 3 : Tần số do dây đàn phát ra. 9
Dạng 4 : Tần số do ống sáo phát ra. 10
Dạng 5 : Hiện tượng...
...
BÀI 10. CƠ CHẾ ĐIỀU HÒA BIỂU HIỆN Ở CẤP ĐỘ TẾ BÀO - CƠ THỂ: 102
CHƯƠNG III. DI TRUYỀN HỌC QUẦN THỂ 105
BÀI 11. DI TRUYỀN HỌC QUẦN THỂ 105
Tự ôn thi Tốt nghiệp, Đại học môn Sinh học ... THÁI HỌC 286
BÀI 19&20: MỘT SỐ KHÁI NIỆM CƠ BẢN, SINH THÁI HỌC CÁ THỂ 286
BÀI 21: SINH THÁI HỌC QUẦN THỂ 286
BÀI 22: SINH THÁI HỌC QUẦN XÃ 286
BÀI 23: SINH THÁI HỌC HỆ SINH THÁI 287
BÀI ... 262
BÀI 10. CƠ CHẾ BIỂU HIỆN Ở CẤP ĐỘ TẾ BÀO - CƠ THỂ: 270
BÀI 11. DI TRUYỀN HỌC QUẦN THỂ 271
BÀI 12. ỨNG DỤNG DI TRUYỀN HỌC TRONG NÔNG NGHIỆP 280
BÀI 13: ỨNG DỤNG TRONG Y HỌC - DI TRUYỀN HỌC...
... độ tan S
% 100 %
S
C
S +100
= ×
IV. Quan hệ giữa nồng độ phần trăm và nồng độ mol.
Ta có:
.100 0
1010
.100 .= = = = =
ct
ct ct
M
dd
dd dd
m
m D m
n D D
M
C C%.
m
V m .M m M M
100 0.D
10
M
D
C C%.
M
⇒ ... phần trăm các chất trong dung dịch sau phản ứng?
Câu 6: Hoà tan 10 (g) CaCO
3
vào 114,1 (g) dung dịch HCl 8%.
Dạng 3: BÀITOÁN VỀ ĐỘ TAN.
@ Hướng giải: Dựa vào định nghóa và dữ kiện bàitoán ta ... 10
0
C. Tính khối lượng tinh thể CuSO
4
.5H
2
O đã tách khỏi dung dịch, biết rằng độ tan của CuSO
4
ở 10
0
C là 17,4g.
ĐS:
4 2
CuSO .5H O
30,7( )m g=
DẠNG 4: BÀITẬP VỀ CÔNG THỨC HOÁ HỌC
BÀI...
... = 0101 1101
2
Tương tự: 2A
16
= 0 010 1 010
2
4B
16
= 0100 101 1
2
6C
16
= 0 110 1101
2
b. Đổi từ nhị phân sang hexa
1101 011
2
: 0 110 = 6; 101 1 = 11=B
⇒
1101 011
2
= 6B
16
Tương tự: 100 0100 1
2
... (I,II,III, )
Câu 9: 19
10
bằng bao nhiêu hệ nhị phân?
A. 100 11 B. 1101 0 C. 101 01 D. 101 10
Câu10: 100 0 0101
2
bằng bao nhiêu hệ hexa?
A. 86 B. 87 C. 85 D. 84
Câu11: 101 01.01 110
2
bằng bao nhiêu ...
Tiết 14: BÀITOÁN VÀ THUẬTTOÁN (Tiếp)
I. Mục tiêu bài học
1. Kiến thức
Luyện tập cách xây dựng ý tưởng, xác định Input và Output của bài toán.
Biểu diễn thuậttoán bằng hai cách: liệt kê...
... ; B = Tậpcác ước số tự nhiên của 12.
c) A = Tậpcác hình bình hành; B = Tậpcác hình chữ nhật;
C = Tậpcác hình thoi; D = Tậpcác hình vng.
d) A = Tậpcác tam giác cân; B = Tậpcác tam ...
TÀI LIỆU ÔN TẬPTOÁN10 528 BÀI HÌNH HỌC -– ĐẠI SỐ
TRUNG TÂM LTĐH 17 QUANG TRUNG ĐT: (0 710) 3751929 Trang 7
Bài 16.
Tìm tất cả cáctập con, cáctập con gồm hai phần tử của cáctập hợp sau: ... SAI S
Ố
TÀI LIỆU ÔN TẬPTOÁN10 528 BÀI HÌNH HỌC -– ĐẠI SỐ
TRUNG TÂM LTĐH 17 QUANG TRUNG ĐT: (0 710) 3751929 Trang 50
BÀI TẬP ƠN CHƯƠNG IV
Bài 161.
Chứng minh các bất đẳng thức sau:
...
... Hóa học10
chương trình chuẩn và nâng cao. Sách gồm cácbàitập Hóa học chọn lọc trong
chương trình Hóa học10 có mở rộng và nâng cao, có thể sử dụng để phát triển
năng lực tư duy Hóa học cho học ... giáo khoa Hóa học10. Mỗi chương bao gồm
các nội dung chính sau:
A- Tóm tắt lí thuyết.
B- Bàitập có hướng dẫn.
C- Hướng dẫn giải
D- Bàitập tự luyện
E- Bàitập trắc nghiệm
F- Thông tin bổ sung,
Sách ... sử dụng làm tài liệu tham khảo cho các thầy, cô giáo, cho các
em học sinh mong có được một nền tảng vững chắc các kiến thức, tư duy và kĩ
năng môn Hóa họclớp10.
Mặc dù chúng tôi đã có nhiều cố...
... 2
2
2
y
5
10 2 10
yx
55
10 2 10
yx
55
Vậy hệ phương trình đã cho có 4 nghiệm:
x1
y1
x1
y1
2 10
x
5
10
y
5
2 10
x
5
10
y
5
. ... 1, phương trình đã cho tương đương:
Hướng dẫn giải CDBT từ các ĐTQG Toánhọc –
110
Bài 2: ĐẠI HỌC KHỐI A NĂM 2 010
Giải hệ phương trình:
2
22
(4x 1)x ... Hướng dẫn giải CDBT từ các ĐTQG Toánhọc –
103
B. ĐỀ THI
Bài 1: ĐẠI HỌC KHỐI A NĂM 2 010
Giải bất phương trình:
2
xx
1
1 2(x x 1)
Giải...
... CHIẾU
Phương pháp
Cách 1: (d) cho bởi phương trình tham số:
Bài toán 1: Tìm hình chiếu H của điểm A trên đường thẳng (d).
Hướng dẫn giải CDBT từ các ĐTQG Toánhọc –
242
x2
x ... hai
Hướng dẫn giải CDBT từ các ĐTQG Toánhọc –
270
8x 3y 2z 3 0
8x 5y 6z 11 0
Bài 10:
Trong không gian với hệ trục Đ các Oxyz, cho mặt phẳng (P): 2x y ... Hướng dẫn giải CDBT từ các ĐTQG Toánhọc –
275
(S
1
): (x + 4)
2
+ (y – 3)
2
+ (z + 2)
2
=
1
3
(S
2
): (x + 6)
2
+ (y – 5)
2
+ (z + 4) =
1
3
Bài 6: ĐẠI HỌC KHỐI A NĂM 2009
Trong...
... 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ướng dẫn giải CDBT từ các ĐTQG Toánhọc –
165
Bài 5: ĐẠI HỌC KHỐI D NĂM 2 010
Cho hình chóp S.ABCD có đáy ABCD là hình vuông cạnh a, cạnh bên ...
I
Hướng dẫn giải CDBT từ các ĐTQG Toánhọc –
170
Suy ra
1
a
d
2
Vậy khoảng cách từ H đến mặt phẳng (SCD) là:
21
2a
dd
33
Bài 14: ĐẠI HỌC KHỐI B NĂM 2006
Cho hình chóp ... d(AB, SN) = AH
2a 39
13
.
Cách 2:
Bàitoán trên ta sử dụng cách 2 bằng cách xây dựng mặt phẳng (SNI) chứa SN và
song song với AB, và khi đó d(AB, SN) = d(A, (SNI)).
Cách 3:
Xét hệ trục Oxyz...
... 120
Lớp B có 2 học sinh, cáclớp C, A mỗi lớp có 1 học sinh. Số cách chọn là:
1 2 1
543
C .C .C 90
Lớp C có 2 học sinh, cáclớp A, B mỗi lớp có 1 học sinh. Số cách chọn là:
1 ...
Số cách chọn 4 học sinh mà mỗi lớp có ít nhất một em được tính như sau:
Lớp A có 2 học sinh, cáclớp B, C mỗi lớp có 1 học sinh. Số cách chọn là:
2 1 1
5 4 3
C .C .C 120
Lớp B ... Đại Học VĨNH VIỄN
303
B. ĐỀ THI
Bài 1: ĐẠI HỌC KHỐI D NĂM 2006
Đội thanh niên xung kích của một trường phổ thông có 12 học sinh, gồm 5 học
sinh lớp A, 4 học sinh lớp B và 3 học sinh lớp...