\text{(E) } 105</math>

\text{(E) } 105</math>

What we want to know is for how many <math>n</math> is <cmath>\gcd(n^2+7, n+4) > 1.</cmath> We start by setting <cmath>n+4 \equiv 0 \mod m</cmath> for some arbitrary <math>m</math>. This shows that <math>m</math> evenly divides <math>n+4</math>. Next we want to see under which conditions <math>m</math> also divides <math>n^2 + 7</math>.  We know from the previous statement that <cmath>n \equiv -4 \mod m</cmath> and thus <cmath>n^2 \equiv (-4)^2 \equiv 16 \mod m.</cmath> Next we simply add <math>7</math> to get <cmath>n^2 + 7 \equiv 23 \mod m.</cmath> However, we also want <cmath>n^2 + 7 \equiv 0 \mod m</cmath> which leads to <cmath>n^2 + 7\equiv 23 \equiv 0 \mod m</cmath> from the previous statement. Since from that statement <math>23</math> divides <math>m</math> evenly, <math>m</math> must be of the form <math>23x</math>, for some arbitrary integer <math>x</math>. After this, we can set <cmath>n+4=23x</cmath> and <cmath>n=23x-4.</cmath> Finally, we must find the largest <math>x</math> such that <cmath>23x-4<1990.</cmath> This is a simple linear inequality for which the answer is <math>x=86</math>, or <math>\fbox{B}</math>.

What we want to know is for how many <math>n</math> is <cmath>\gcd(n^2+7, n+4) > 1.</cmath> We start by setting <cmath>n+4 \equiv 0 \mod m</cmath> for some arbitrary <math>m</math>. This shows that <math>m</math> evenly divides <math>n+4</math>. Next we want to see under which conditions <math>m</math> also divides <math>n^2 + 7</math>.  We know from the previous statement that <cmath>n \equiv -4 \mod m</cmath> and thus <cmath>n^2 \equiv (-4)^2 \equiv 16 \mod m.</cmath> Next we simply add <math>7</math> to get <cmath>n^2 + 7 \equiv 23 \mod m.</cmath> However, we also want <cmath>n^2 + 7 \equiv 0 \mod m</cmath> which leads to <cmath>n^2 + 7\equiv 23 \equiv 0 \mod m</cmath> from the previous statement. Since from that statement <math>23</math> divides <math>m</math> evenly, <math>m</math> must be of the form <math>23x</math>, for some arbitrary integer <math>x</math>. After this, we can set <cmath>n+4=23x</cmath> and <cmath>n=23x-4.</cmath> Finally, we must find the largest <math>x</math> such that <cmath>23x-4<1990.</cmath> This is a simple linear inequality for which the answer is <math>x=86</math>, or <math>\fbox{B}</math>.