I just bought a Bushnell 6x24 with mil dots and I'm about to sight it in at the range. My question to those who know more than I is... "I understand the Mil dots do not represent exactly 300, 400, and 500yds (if sighted in to 200yds) but the local range only goes to 200yds so how can I figure out the distance those mil dots represent if I center them on the target. Is there a equation to figure out the approx distance they (mil dots) represent? Such as if 200yds is zero than 1st dot down is 275yds? I know the ammo used affects this but I will be using the same ammo afield.
Thanks
I see a number of very interesting replies from very knowledgeable shooters and from those, I have learned a lot about the subject.
I can now say that I'm starting to understand a wee bit about the mil dot system. With this in mind, I went back and read the original post very carefully and now I believe I know what Bell Cowby wants to do using this system.
He basically wants to set his sights at 200 yd and then use the mil dots to compensate for distance. This can be done by the following:
1. Obtain from ballistics tables the bullet drop in inches at the various distances up to whatever distance you want to shoot. For example, a 308, 150 gr caliber bullet with a muzzle velocity of 2820 fps will have the following trajectory when zeroed at 200 yd (this is for a particular type and shape of a bullet):
100 yd: +2.4"
150 yd: +2.0
200 yd: 0.0"
250 yd: -3.8"
300 yd: -9.8"
400 yd: -29.3"
500 yd: -62.0"
2. Then convert these drops in inches to mils using the relationships
1 mil = 3.6" at 100 yd, 7.2" at 200 yd, 10.8" at 300 yd, etc. (distance in yd/100yd X 3.6")
So, for example, at 300 yd, a mil is equal to 10.8" so with a bullet drop of 9.8", this would equivalent to 0.9 mils. (bullet drop in inches/distance of 1 mil at 300 yd)
And, for example at 500 yd, a mil is equal to 18" so with a bullet drop of 62", this would be equivalent to 3.44 mils
3.0 All that you have to do now is draw up a table using what ever distances you need and calculating the equivalent mils as explained above using the trajectory information for the caliber you are using. Ballistics information can be obtained from various sources including the Internet, reference manuals, etc.
In the example used here we would have:
Yards ..........Mil
100 ------ 0.67 above
200 ------ 0.00 zero
250 ------ 0.42 below
300 ------ 0.90 below
400 ------ 2.03 below
500 ------ 3.44 below
4.0 All this could be programmed in an Excel spread sheet with the bullet drop and the distance independent variables (input) and mils as output (dependant variable).
5.0 To go further and use each mil dot to represent the correction for a specific distance in yards using a specific caliber, etc, would require considerably more complex calculations. This is because the distance in inches covered by 1 mil changes as the shooting distance to the target changes. This also applies to the bullet drop with the drop not being a linear change. For example to come up with something like 1 mil dot is the correction when using caliber/bullet X when shooting at Y yards. If we look at the situation above, we will note that 1 mil dot would be a correction for a shooting distance of slightly greater than 300 yards.
In the end, a laser range finder would be of great help for hunting although theoretically, you could use the mil dot scope to estimated the distance. The main problem with using this approach would be to find an object that you can estimate the height/width fairly accurately.
Please let us know how you make out.
Duke1
