As shown in the figure below, for a natural number $n$, the $n$ terms $$\left[ \frac { n } { 1 } \right] , \left[ \frac { n } { 2 } \right] , \left[ \frac { n } { 3 } \right] , \cdots , \left[ \frac { n } { n } \right]$$ are arranged in the $n$-th row from column 1 to column $n$ in order. (Here, $[ x ]$ is the greatest integer not exceeding $x$.) Which of the following in $\langle$Remarks$\rangle$ are correct? [4 points] $\langle$Remarks$\rangle$ ㄱ. In the $n$-th row, the number of terms with value 1 is $\left[ \frac { n + 1 } { 2 } \right]$. ㄴ. In the 100th row, the number of terms with value 3 is 8. ㄷ. In the 3rd column, the number of terms with value 5 is 5. (1) ㄱ (2) ㄴ (3) ㄷ (4) ㄱ, ㄴ (5) ㄱ, ㄴ, ㄷ
As shown in the figure below, for a natural number $n$, the $n$ terms
$$\left[ \frac { n } { 1 } \right] , \left[ \frac { n } { 2 } \right] , \left[ \frac { n } { 3 } \right] , \cdots , \left[ \frac { n } { n } \right]$$
are arranged in the $n$-th row from column 1 to column $n$ in order.\\
(Here, $[ x ]$ is the greatest integer not exceeding $x$.)
Which of the following in $\langle$Remarks$\rangle$ are correct? [4 points]
$\langle$Remarks$\rangle$\\
ㄱ. In the $n$-th row, the number of terms with value 1 is $\left[ \frac { n + 1 } { 2 } \right]$.\\
ㄴ. In the 100th row, the number of terms with value 3 is 8.\\
ㄷ. In the 3rd column, the number of terms with value 5 is 5.\\
(1) ㄱ\\
(2) ㄴ\\
(3) ㄷ\\
(4) ㄱ, ㄴ\\
(5) ㄱ, ㄴ, ㄷ