a) \(x=-2\)
b) \(x=6\)
a) \(\sqrt{14-x}\)+\(\sqrt{2-x}\)=6 ( đk: x<14 <; x<2)
⇔\(\sqrt{14-x}\)=6-\(\sqrt{2-x}\)
⇔(\(\sqrt{14-x}\))2= ( 6-\(\sqrt{2-x}\))2
⇔14-x= 36-12\(\sqrt{2-x}\)+2-x
⇔-x+x+12\(\sqrt{2-x}\)= -14+36+2
⇔12\(\sqrt{2-x}\)= 24
⇔\(\sqrt{2-x}\)=2
⇔(\(\sqrt{2-x}\))2= 4
⇔2-x=4
⇔-x=2
⇔x=-2 ( thỏa man điều kiện xác định)
Vậy x=-2
b)\(\sqrt{x+3}\)-\(\sqrt{x-5}\)=2 ( đk :x≥5)
⇔\(\sqrt{x+3}\)= 2+\(\sqrt{x-5}\)
⇔(\(\sqrt{x+3}\))2= (2+\(\sqrt{x-5}\))2
⇔x+3= 4 +4\(\sqrt{x-5}\) +x-5
⇔x-x-\(4\sqrt{x-5}\)= -3+4-5
⇔ \(-4\sqrt{x-5}\)=-4
⇔\(\sqrt{x-5}\)=1
⇔x-5=1
⇔x=6 ( thỏa mãn điều kiện xác định)
Vậy x=6
a) \(\sqrt{14-x}\)+\(\sqrt{2-x}\)=6 ( đk: x<14 <; x<2)
⇔\(\sqrt{14-x}\)=6-\(\sqrt{2-x}\)
⇔(\(\sqrt{14-x}\))2= ( 6-\(\sqrt{2-x}\))2
⇔14-x= 36-12\(\sqrt{2-x}\)+2-x
⇔-x+x+12\(\sqrt{2-x}\)= -14+36+2
⇔12\(\sqrt{2-x}\)= 24
⇔\(\sqrt{2-x}\)=2
⇔(\(\sqrt{2-x}\))2= 4
⇔2-x=4
⇔-x=2
⇔x=-2 ( thỏa man điều kiện xác định)
Vậy x=-2
b)\(\sqrt{x+3}\)-\(\sqrt{x-5}\)=2 ( đk :x≥5)
⇔\(\sqrt{x+3}\)= 2+\(\sqrt{x-5}\)
⇔(\(\sqrt{x+3}\))2= (2+\(\sqrt{x-5}\))2
⇔x+3= 4 +4\(\sqrt{x-5}\) +x-5
⇔x-x-\(4\sqrt{x-5}\)= -3+4-5
⇔ \(-4\sqrt{x-5}\)=-4
⇔\(\sqrt{x-5}\)=1
⇔x-5=1
⇔x=6 ( thỏa mãn điều kiện xác định)
Vậy x=6