116824 Let \(R\) be the relation on the set \(R\), of all real numbers defined by aRb if \(f(x)=|a-b| \leq 1\). Then, \(R\) is

116825 On set \(A=\{1,2,3\}\), relations \(R\) and \(S\) are given by
\(\mathbf{R}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{2}),(\mathbf{2}, \mathbf{1})\},\)
\(\mathrm{S}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{3}),(\mathbf{3}, \mathbf{1})\}\).
Then,

116828 Let a relation \(R\) be defined on set of all real numbers by \(\mathbf{R} \mathbf{b}\) if and only if \(1+\mathbf{a b}>\mathbf{0}\). Then, \(R\) is

116830 An integer \(m\) is said to be related to another integer \(n\), if \(m\) is a multiple of \(n\). Then, the relation is

116831 The relation \(R\) in \(R\) defined by \(R=\{(a, b): a \leq\) \(\mathbf{b}^3\) ), is

116824 Let \(R\) be the relation on the set \(R\), of all real numbers defined by aRb if \(f(x)=|a-b| \leq 1\). Then, \(R\) is

116825 On set \(A=\{1,2,3\}\), relations \(R\) and \(S\) are given by
\(\mathbf{R}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{2}),(\mathbf{2}, \mathbf{1})\},\)
\(\mathrm{S}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{3}),(\mathbf{3}, \mathbf{1})\}\).
Then,

116828 Let a relation \(R\) be defined on set of all real numbers by \(\mathbf{R} \mathbf{b}\) if and only if \(1+\mathbf{a b}>\mathbf{0}\). Then, \(R\) is

116830 An integer \(m\) is said to be related to another integer \(n\), if \(m\) is a multiple of \(n\). Then, the relation is

116831 The relation \(R\) in \(R\) defined by \(R=\{(a, b): a \leq\) \(\mathbf{b}^3\) ), is

116824 Let \(R\) be the relation on the set \(R\), of all real numbers defined by aRb if \(f(x)=|a-b| \leq 1\). Then, \(R\) is

116825 On set \(A=\{1,2,3\}\), relations \(R\) and \(S\) are given by
\(\mathbf{R}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{2}),(\mathbf{2}, \mathbf{1})\},\)
\(\mathrm{S}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{3}),(\mathbf{3}, \mathbf{1})\}\).
Then,

116828 Let a relation \(R\) be defined on set of all real numbers by \(\mathbf{R} \mathbf{b}\) if and only if \(1+\mathbf{a b}>\mathbf{0}\). Then, \(R\) is

116830 An integer \(m\) is said to be related to another integer \(n\), if \(m\) is a multiple of \(n\). Then, the relation is

116831 The relation \(R\) in \(R\) defined by \(R=\{(a, b): a \leq\) \(\mathbf{b}^3\) ), is

116824 Let \(R\) be the relation on the set \(R\), of all real numbers defined by aRb if \(f(x)=|a-b| \leq 1\). Then, \(R\) is

116825 On set \(A=\{1,2,3\}\), relations \(R\) and \(S\) are given by
\(\mathbf{R}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{2}),(\mathbf{2}, \mathbf{1})\},\)
\(\mathrm{S}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{3}),(\mathbf{3}, \mathbf{1})\}\).
Then,

116828 Let a relation \(R\) be defined on set of all real numbers by \(\mathbf{R} \mathbf{b}\) if and only if \(1+\mathbf{a b}>\mathbf{0}\). Then, \(R\) is

116830 An integer \(m\) is said to be related to another integer \(n\), if \(m\) is a multiple of \(n\). Then, the relation is

116831 The relation \(R\) in \(R\) defined by \(R=\{(a, b): a \leq\) \(\mathbf{b}^3\) ), is

116824 Let \(R\) be the relation on the set \(R\), of all real numbers defined by aRb if \(f(x)=|a-b| \leq 1\). Then, \(R\) is

116825 On set \(A=\{1,2,3\}\), relations \(R\) and \(S\) are given by
\(\mathbf{R}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{2}),(\mathbf{2}, \mathbf{1})\},\)
\(\mathrm{S}=\{(\mathbf{1}, \mathbf{1}),(\mathbf{2}, \mathbf{2}),(\mathbf{3}, \mathbf{3}),(\mathbf{1}, \mathbf{3}),(\mathbf{3}, \mathbf{1})\}\).
Then,

116828 Let a relation \(R\) be defined on set of all real numbers by \(\mathbf{R} \mathbf{b}\) if and only if \(1+\mathbf{a b}>\mathbf{0}\). Then, \(R\) is

116830 An integer \(m\) is said to be related to another integer \(n\), if \(m\) is a multiple of \(n\). Then, the relation is

116831 The relation \(R\) in \(R\) defined by \(R=\{(a, b): a \leq\) \(\mathbf{b}^3\) ), is