Let $\mathrm { A } = \{ - 2 , - 1,0,1,2,3,4 \}$ and R be a relation R , such that $\mathbf { R } = \{ ( \mathbf { x } , \mathbf { y } ) : ( \mathbf { 2 x } + \mathbf { y } ) \leq - \mathbf { 2 } , \mathbf { x } \in \mathbf { A } , \mathbf { y } \in \mathbf { A } \}$.\ Let $\boldsymbol { l } =$ number of elements in $\mathbf { R }$\ $\mathrm { m } =$ minimum number of elements to be added in R to make it reflexive.\ $\mathrm { n } =$ minimum number of elements to be added in R to make it symmetric, then $( 1 + m + n )$ is\ (A) 17\ (B) 10\ (C) 11\ (D) 14
Let $\mathrm { A } = \{ - 2 , - 1,0,1,2,3,4 \}$ and R be a relation R , such that $\mathbf { R } = \{ ( \mathbf { x } , \mathbf { y } ) : ( \mathbf { 2 x } + \mathbf { y } ) \leq - \mathbf { 2 } , \mathbf { x } \in \mathbf { A } , \mathbf { y } \in \mathbf { A } \}$.\
Let $\boldsymbol { l } =$ number of elements in $\mathbf { R }$\
$\mathrm { m } =$ minimum number of elements to be added in R to make it reflexive.\
$\mathrm { n } =$ minimum number of elements to be added in R to make it symmetric, then $( 1 + m + n )$ is\
(A) 17\
(B) 10\
(C) 11\
(D) 14