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TRƯỜNG ĐẠI HỌC VINH
TRƯỜNG THPT CHUYÊN

ĐỀ THI THỬ THPT QUỐC GIA, LẦN III - 2015
Môn: VẬT LÍ (Thời gian làm bài: 90 phút, 50 câu trắc nghiệm)
Họ, tên thí sinh: Số báo danh
Mã đề thi 135
Cho biết: hằng số Plăng
-34
h = 6,625.10 J.s,
độ lớn điện tích nguyên tố
19
e 1,6.10 C,

 tốc độ ánh sáng trong chân
không (không khí)
8
c 3.10 m / s,


2
g = 10 m/s ,
số Avôgađrô
,mol10.023,6N
123
A



.MeV5,931c.u1

D.
L
cos(100 π t +π 6)u = 30 2
(V)
.

Câu 2: Hai điểm sáng dao động điều hoà trên một đường thẳng có cùng vị trí cân bằng, cùng biên độ, có tần số
1
f 2 Hz

và
2
f 4 Hz.

Khi chúng có tốc độ v
1
và v
2
với
2 1
v 2v ,

thì tỉ số độ lớn gia tốc tương ứng
2 1
a / a
bằng
A. 2. B. 1/4. C. 4. D. 1/2.
Câu 3: Trên mặt nước có hai nguồn phát sóng kết hợp A và B dao động điều hòa theo phương thẳng đứng, cùng
pha, cùng tần số 40 Hz. Tại điểm M trên mặt nước, cách A và B lần lượt là 16 cm và 22 cm, phần tử nước tại đó
dao động với biên độ cực đại. Trong khoảng giữa M và đường trung trực của AB còn có 3 đường cực đại nữa. Tốc

A. 9,95.10
5
kg. B. 27,5.10
6
kg. C. 7,75.10
5
kg. D. 86,6.10
4
kg.
Câu 7: Vận tốc truyền âm trong không khí là 340 m/s, khoảng cách giữa hai điểm gần nhau nhất trên cùng một
phương truyền sóng dao động ngược pha là 0,85 m. Tần số của sóng âm bằng
A. 400 Hz. B. 200 Hz. C. 300 Hz. D. 100 Hz.
Câu 8: Một con lắc lò xo nằm ngang gồm vật nhỏ khối lượng 200 g, lò xo khối lượng không đáng kể có độ cứng
100 N/m, hệ số ma sát trượt giữa vật và mặt phẳng ngang là 0,1. Ban đầu, vật được giữ ở vị trí lò xo giãn 10 cm
rồi truyền cho vật vận tốc
v 2,5 m / s

theo hướng làm lò xo giãn thêm. Đến khi lò xo giãn nhiều nhất, độ tăng thế
năng đàn hồi của con lắc so với vị trí ban đầu là
A. 1,025 J. B. 0,856 J. C. 0,615 J. D. 1,230 J.
Câu 9: Một mạch điện xoay chiều nối tiếp theo thứ tự gồm điện trở RCL và điện trở
1
R = 50 .

Đặt vào hai đầu
đoạn mạch trên một điện áp xoay chiều
u =100 2cos
ωt (V)
(có


12 V.
Giá trị của L bằng

C
L
R
K
E, r

A.
H.2,88

B.
mH.0,288
C.
mH.0,144
D.
H.1,44


Câu 11: Trong thí nghiệm Y-âng về giao thoa ánh sáng, khoảng cách giữa hai khe sáng là 3 mm, khoảng cách từ
mặt phẳng chứa hai khe đến màn là 2 m. Giữa hai điểm M, N đối xứng nhau qua vân trung tâm có 13 vân sáng (tại
M, N là 2 vân tối) và
mm.3,9 MN

Bước sóng của ánh sáng chiếu đến hai khe là
A. 0,52


m

Câu 14: Tỉ số hạt nhân
C14
và
C12
trong một mẫu gỗ cổ đại tìm thấy bằng một nửa tỉ số hạt nhân
C14
và
C12

có trong không khí hiện tại. Biết
C14
phóng xạ
-
β
có chu kỳ bán rã 5730 năm. Tuổi của mẫu gỗ cổ đại là
A.
11460
năm. B.
5730
năm. C.
2865
năm. D.
8595
năm.
Câu 15: Vật dao động cơ điều hòa đổi chiều chuyển động khi lực kéo về (hay lực hồi phục)
A. có độ lớn cực tiểu. B. có độ lớn cực đại. C. bằng không. D. đổi chiều.
Câu 16: Có hai máy phát điện xoay chiều một pha, các cuộn dây trên stato của hai máy giống nhau (bỏ qua điện
trở thuần); số cuộn dây này tỉ lệ với số cặp cực trên mỗi rôto; từ trường của mỗi cặp cực trong hai máy cũng như
nhau. Máy thứ nhất, rô to có 2 cặp cực, nối với mạch ngoài là một cuộn dây không thuần cảm; khi cho rô to quay
với tốc độ n vòng/s thì công suất tỏa nhiệt trên cuộn dây là P và điện áp tức thời hai cực máy phát sớm pha hơn

khi
2
x 0 cm
 thì
x 6 3 cm.

Giá trị của A có thể là
A. 11,83 cm. B. 14,27 cm. C. 13,11 cm. D. 15,32 cm.
Câu 20: Một nhà máy phát điện có 5 tổ máy có cùng công suất P. Điện áp tạo ra sẽ qua một máy tăng áp để đưa
lên đường dây tải điện truyền đến nơi tiêu thụ. Khi một tổ máy hoạt động, hiệu suất truyền tải điện là
95 %.
Khi cả
5 tổ máy hoạt động (các tổ máy ghép song song để nâng cao công suất), hiệu suất truyền tải là
A.
87,5 %.
B.
97,5 %.
C.
68 %.
D.
75 %.

Câu 21: Trong nguyên tử hiđrô, xét các mức năng lượng từ K đến P, có bao nhiêu khả năng kích thích để êlectron
tăng bán kính quỹ đạo lên 4 lần?
A. 4. B. 2. C. 5. D. 3.
Câu 22: Từ thông qua một khung dây dẫn phẳng biến thiên điều hòa theo thời gian theo quy luật
) t cos(
10
 làm trong khung dây dẫn xuất hiện một suất điện động cảm ứng ). t cos(Ee
20

F F cos6,5
πt (N),

3 0
F F cos6,8
πt (N),

4 0
F F cos6,1
πt (N).
 Vật
dao động cơ cưỡng bức với biên độ lớn nhất khi chịu tác dụng của lực
A. .F
3
B. .F
2
C. .F
1
D. .F
4

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