THI MINH HA K THI THPT QUC GIA NM 2017 Mụn: TON s 067 Thi gian lm bi: 90 phỳt Cõu 1: ng cong hỡnh bờn l th ca hm s no ? A y = x4 + x2 B y = x x + C y = x x + D y = x x + Cõu 2: Cho hm s y = A B S tim cn ca th hm s bng x2 C.3 D 1 Cõu 3: Cho hm s y = x3 + m x + ( 2m 1) x Mnh no sau õy l sai? A m < thỡ hm s cú hai im cc tr C m thỡ hm s cú cc i v cc tiu B Hm s luụn luụn cú cc i v cc tiu D m > thỡ hm s cú cc tr Cõu 4: Kt lun no sau õy v tớnh n iu ca hm s y = 2x + l ỳng? x +1 A Hm s ng bin trờn cỏc khong (; 1) v (1; +) B Hm s luụn luụn ng bin trờn R\{1}; C Hm s nghch bin trờn cỏc khong (; 1) v (1; +); D Hm s luụn luụn nghch bin trờn R\{1}; Cõu 5: Cho hm s y = A (-1;2) x3 x + x + To im cc i ca hm s l 3 B (3; ) C (1;-2) D (1;2) Cõu 6: Trờn khong (0; +) thỡ hm s y = x3 + 3x + : A Cú giỏ tr nh nht l Min y = B Cú giỏ tr ln nht l Max y = C Cú giỏ tr nh nht l Min y = D Cú giỏ tr ln nht l Max y = Cõu 7: Cho hm s y = f(x)= ax3+bx2+cx+d ,a Khng nh no sau õy sai ? A th hm s luụn ct trc honh B th hm s luụn cú tõm i xng f ( x) = +, a > C Hm s luụn cú cc tr D xlim + Cõu 8: Khong cỏch gia im cc tr ca thi hm s y = x mx + m bng : x D A B C Cõu 9: Hm s y = x x nghch bin trờn khong: A (0;1) B (1;+ ) C (1;2) D (0;2) 2 Cõu 10: th hm s y = mx + ( m 9) x + 10 cú im cc tr thỡ giỏ tr ca m l: A ( ; 3) ( 0;3) B ( 3;+ ) C ( 3;0 ) ( 3; + ) D Ă \ { 0} Cõu 11 th hm s y = x 3mx + m + tip xỳc vi trc honh khi: A m B m = C m = 1 D m = Cõu 12 Phng trỡnh log x = cú nghim x bng: A B C D Cõu 13 Phng trỡnh x + x = cú nghim x bng: A B v -2 C -2 D x Cõu 14 Cho hm s f ( x) = x.e Giỏ tr ca f ' ' (0) l: A B 2e C 3e D Cõu 15 Gii bt phng trỡnh log (2x 1) > A x>4 B x> 14 C x0 cú cc tr nờn l hm trựng phng Cõu 2: ỏp ỏn B; Hng dn: Hm s cú gii hn vụ cc nờn cú tim cn Cõu 3: ỏp ỏn B Hng dn: y ' = x 2mx + 2m cú ' = (m 1) > m hm s khụng cú cc tr ti x = Cõu 4: ỏp ỏn A > x nờn hm s ng bin trờn cỏc khong xỏc nh Hng dn: y ' = ( x + 1) Cõu 5: ỏp ỏn C Hng dn: Hm s cú im C l (1;2) Cõu 6: ỏp ỏn D Hng dn: Hm s cú im C l (1;3) nờm Max y=3 Cõu 7: ỏp ỏn C Hng dn: Hm s s khụng cú cc tr nu phng trỡnh y = vụ nghim Cõu 8: ỏp ỏn B Hng dn: Hai im cc tr l A(0;-m) v B(2;4-m) nờn AB = Cõu 9: ỏp ỏn C Hng dn: Hm bc cn bc cú xỏc nh (0;2) cú h s a