Ôn tẬp chƯƠng ii mŨ logarit
DESCRIPTION
ĐÂY LÀ TÀI LIỆU ÔN TẬP CHƯƠNG MŨ LOGARIT CHƯƠNG TRÌNH THPT, TÀI LIỆU ÔN TẬP CHƯƠNG 2 CHO GIÁO VIÊN VÀ CÁC HỌC SINH THAM KHẢO TRONG QUÁ TRÌNH HỌC TẬP. This document is belong to original authorTRANSCRIPT
PHNG TRNH MU VA PHNG TRNH LOGARIT
CNG N TPPHNG TRNH MU VA PHNG TRNH LOGARIT
Van e 1: Phng trnh mu
Dang 1. a ve cung c so
Bai 1 : Giai Cac phng trnh sau
1)
2)
3)
4)
5) 52x + 1 3. 52x -1 = 110
6)
7) 2x + 2x -1 + 2x 2 = 3x 3x 1 + 3x - 2 8) (1,25)1 x =
9.
10) (x = -3);
Dang 2. at an phu
Bai 2 : Giai cac phng trnh
1) 22x + 5 + 22x + 3 = 12
2) 92x +4 - 4.32x + 5 + 27 = 0
3) 52x + 4 110.5x + 1 75 = 0
4)
5)
6)
7) 8.
9). 10)
11). 12)
13) 14).
15). 16).
17). 18)
19). 20) 21). 22)
23) 2.16x 17.4x + 8 = 0 (x = ; x = );
24) 25x 12.2x 6,25.0,16x = 0 (x = 1);
25) 4x - (x = 4);
26) 5x 1 + 5.0,2x 2 = 26 (x = 1; x = 3).
27) (x = -3; x = -2);
29) 2x + 2x - 1 + 2x 2 = 3x - 3x - 1 + 3x 2 (x = x = 2); 28) 2x.3x 1.5x 2 = 12 (x = 2);
Dang 3. Logarit hoa
Bai 3 Giai cac phng trnh
a) 2x - 2 = 3
b) 3x + 1 = 5x 2
c) 3x 3 =
d)
e)
f) 52x + 1- 7x + 1 = 52x + 7x
Van e 2: Phng trnh logaritDang 1. a ve cung c so
Bai 5: giai cac phng trnh
a) log4(x + 2) log4(x -2) = 2 log46
b) lg(x + 1) lg( 1 x) = lg(2x + 3)
c) log4x + log2x + 2log16x = 5
d) log4(x +3) log4(x2 1) = 0
e) log3x = log9(4x + 5) +
f) log4x.log3x = log2x + log3x 2
g) log2(9x 2+7) 2 = log2( 3x 2 + 1) h.
i. k.
m). n)
Dang 2. at an phu Bai 6: giai phng trnh
a)
b) logx2 + log2x = 5/2 r)
c) logx + 17 + log9x7 = 0
d) log2x + s)
e) log1/3x + 5/2 = logx3
f) 3logx16 4 log16x = 2log2x
BAT PHNG TRNH MU VA BAT PHNG TRNH LOGARITVan e 1: Bat Phng trnh mu
Bai 8: Giai cac bat phng trnh
1) 16x 4 8
2)
3)
4)
5)
6) 52x + 2 > 3. 5x 7)
Bai 9: Giai cac bat phng trnh
1) 22x + 6 + 2x + 7 > 17
2) 52x 3 2.5x -2 3c)
3) 5.4x +2.25x 7.10x
4) 2. 16x 24x 42x 2 15 5) 4x +1 -16x 2log48
6) 9.4-1/x + 5.6-1/x < 4.9-1/x
Bai 10: Giai cac bat phng trnh
1) 3x +1 > 5
2) (1/2) 2x - 3 3
3) 5x 3x+1 > 2(5x -1 - 3 x 2)
4) 5) 6)
Van e 2: Bat Phng trnh logarit
Bai 11: Giai cac bat phng trnh
1) log4(x + 7) > log4(1 x) 2) log2( x + 5) log2(3 2x) 4 3) log2( x2 4x 5) < 4
4) log1/2(log3x) 0 5) 2log8( x- 2) log8( x- 3) > 2/3 6) log2x(x2 -5x + 6) < 1
7)
8)
9) 10) 11)
12)
Bai 12: Giai cac bat phng trnh
1) log22 + log2x 0
2) log1/3x > logx3 5/2
3) log3(x + 2) log3( 2 x)4) log5(2x + 1) < 5 2x 5) log2( 5 x) > x + 1
HM S M-LOGARIT
Bi 13: Tnh :
a/
b/
c/
d/
e) ;
f) ;
g) ;
h) ;
i) k/ln25 - ln2;
l) log248 - log227;
bi 14 TNH :
a) A = ;
b) B = ;
c) C =;
d) D = ;
e) E =;
f) F =;
Bi 15: a/ Tm gi tr ln nht, gi tr nh nht ca hm s: trn on
b/Tm gi tr ln nht, gi tr nh nht ca hm s trn na khong
BI 16: Tnh o hm ca hm s
A/
b/
c/
d/
e/ y=
Bi 17: Tm tp xc nh ca hm s
a/ b/
c/
Bi 18: a: Cho a = log315, b = log310. Hay tnh theo a va b.
b/: Cho a = log33, b = log35, c = log72. Hay tnh theo a, b va c.
c/: Cho log25 = (. Hay tnh log41250 theo (.
d/ Cho a = log315, b = log310. Hay tnh theo a va b.
e/ Cho a = log33, b = log35, c = log72. Hay tnh theo a, b va c.
f/ Cho a = log23, b = log35, c = log72. Hay tnh log14063 theo a, b, c.
g/ Cho log303 = a, log305 = b. Tnh log302 va log308 theo a va b.
mu
Cu 1: Rt gn biu thc: vi a>0
Cu 2: Tnh: A/ B/ B =;Cu 3: Gii phng trnh:
1)
2) 3/ 6.9x 13.6x + 6.4x = 0 (x = (1);Cu 4: Gii bt phng trnh: 1)
2)
Cu 5: Tm gi tr ln nht, gi tr nh nht ca hm s: trn on [1;e]PAGE 2
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