2 intersecting lines are shown. A line with points M, H, K intersects a line with points L, H, J at point H. 4 angles are created. Clockwise, from the top, the angles are (5 m + 100) degrees, blank, blank, (2 m + 10) degrees.

To find the value of m, we need to use the fact that angles that are on a straight line add up to 180 degrees.

The top angle is given as (5m + 100) degrees.

The angle below it is a straight line angle, which means it is equal to 180 - (5m + 100) degrees.

The next angle is given as blank degrees.

The bottom angle is given as (2m + 10) degrees.

Since we have a total of 360 degrees in a circle, the sum of the angles in a quadrilateral is 360 degrees.

Therefore, we can write the equation:

(5m + 100) + (180 - (5m + 100)) + (blank) + (2m + 10) = 360.

Simplifying this equation, we get:

180 + (blank) + 2m + 10 = 360.

Combining like terms, we have:

(blank) + 2m + 190 = 360.

Subtracting 190 from both sides, we have:

(blank) + 2m = 170.

Now, we know that the sum of the two blank angles must be 180 degrees, since they are adjacent and form a straight angle.

Therefore, we can write the equation:

(blank) + (blank) = 180.

Substituting the value of (blank) from the previous equation, we have:

170 + (blank) = 180.

Subtracting 170 from both sides, we have:

(blank) = 10.

Therefore, the value of m is 10.