a) căn(2x+5) - căn(3-x) = x2 -5x + 8
Điều kiện : \(-\frac{5}{2}\Leftarrow x\Leftarrow3\)
căn(2x+5) - căn(3-x) = x^2-5x+8
\(\Leftrightarrow\)[căn(2x+5)-3]-[căn(3-x)-1]=x2 -5x+6
nhân liên hợp
\(\Leftrightarrow\)(2x+5-9) / [căn(2x+5)+3] -(3-x-1) / [căn (3-x)+1]=(x-2)(x-3)
\(\Leftrightarrow\)(2x-4) / [căn (2x+5)+3] -(2-x) / [ căn (3-x)+1]-(x-2)(x-3)=0
\(\Leftrightarrow\)(x-2).M=0
\(\Leftrightarrow\)x=2 hoặc M=0
M=2 / [căn(2x+5)+3]+1 / [căn(3-x)+1]-x+3
2/[can(2x+5)+3]+1/[can(3-x)+1]>0 voi moi x
voi -5/2<=x<=3 <->3-x thuoc[0;11/2]
nen M>0
vay x=2
b/ 2+ căn(3-8x) = 6x + căn(4x-1)
dk[1/4;8/3]
6x-2+căn(4x-1)-căn(3-8x)=0
<->2(3x-1)+(4x-1-3+8x)/[căn(4x-1)+căn(...
<->2(3x-1)+(12x-4)/[căn(4x-1)+căn(3-8x...
<->2(3x-1)+4(3x-1)/[căn(4x-1)+căn(3-8x...
<->(3x-1){2+4/[căn(4x-1)+căn(3-8x)]}=0
2+4/[căn(4x-1)+căn(3-8x)>0
nen 3x-1=0
x=1/3
a) căn(2x+5) - căn(3-x) = x^2-5x+8
dkxd -5/2<=x<=3
căn(2x+5) - căn(3-x) = x^2-5x+8
<->[can(2x+5)-3]-[can(3-x)-1]=x^2-5x+6
nhan lien hop
<->(2x+5-9)/[can(2x+5)+3] -(3-x-1)/[can(3-x)+1]=(x-2)(x-3)
<->(2x-4)/[can(2x+5)+3] -(2-x)/[can(3-x)+1]-(x-2)(x-3)=0
<->(x-2).M=0
<->x=2 hoac M=0
M=2/[can(2x+5)+3]+1/[can(3-x)+1]-x+3
2/[can(2x+5)+3]+1/[can(3-x)+1]>0 voi moi x
voi -5/2<=x<=3 <->3-x thuoc[0;11/2]
nen M>0
vay x=2
b/ 2+ căn(3-8x) = 6x + căn(4x-1)
dk[1/4;8/3]
6x-2+căn(4x-1)-căn(3-8x)=0
<->2(3x-1)+(4x-1-3+8x)/[căn(4x-1)+căn(...
<->2(3x-1)+(12x-4)/[căn(4x-1)+căn(3-8x...
<->2(3x-1)+4(3x-1)/[căn(4x-1)+căn(3-8x...
<->(3x-1){2+4/[căn(4x-1)+căn(3-8x)]}=0
2+4/[căn(4x-1)+căn(3-8x)>0
nen 3x-1=0
x=1/3
