Giải bất phương trình √m<m-1

Dongha2312

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Loga Sinh Học lớp 12

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hoctaptot1256

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nguyenlehuongly06092002

Đáp án:

Giải thích các bước giải:

√m<m-1 điều kiện:m-1$\geq$0⇒m$\geq$ 1

⇔$\left \{ {{m\geq0} \atop {m<(m-1)^{2}}} \right.$

⇔$\left \{ {{m\geq0} \atop {m<m^{2}-2m+1}} \right.$

⇔$\left \{ {{m\geq0} \atop {m^{2}-2m+1-m>0}} \right.$

⇔ $\left \{ {{m\geq0} \atop {m^{2}-3m+1>0}} \right.$

⇔$\left \{ {{m\geq0} \atop {\left[ \begin{array}{l}m<\frac{3-√5}{2}\\m>\frac{3+√5}{2}\end{array} \right. }} \right.$

Kết hợp đk ta đc

S=($\frac{3+√5}{2}$;+vô cực)

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