Search results
Results from the WOW.Com Content Network
4th Landing Support Battalion (4th LSB) was a Military Landing Support battalion of the United States Marine Corps Reserve. The unit was based out of New Orleans, LA (A Co.), Savannah, GA (B Co.), and Charleston, SC (C Co), and fell under the command of the 4th Marine Logistics Group (4th MLG) .
1st Distribution Support Battalion (1st DSB) is a logistics battalion in the United States Marine Corps that supports distributed maritime operations and expeditionary advanced base operations. [1]
The 4th Marine Logistics Group (MLG) comprises a Headquarters and Service Battalion along with two Combat Logistics Regiments (CLR), each CLR contains two Combat Logistics Battalions. 4th MLG also contains an Engineer Support Battalion, a Medical Battalion, and a Dental Battalion:
This page was last edited on 7 December 2020, at 12:43 (UTC).; Text is available under the Creative Commons Attribution-ShareAlike 4.0 License; additional terms may apply.
On 12 January 2024, the unit was deactivated, and subordinate elements of 1st TB were aligned with 1st LSB to become 1st Distribution Support Battalion. The 1st TB headquarters was redesignated as Headquarters and Support Battalion. The last 1st TB commander was LtCol Andrew Harkins.
2d Landing Support Battalion (2d LSB) was a logistics battalion in the United States Marine Corps that supports distributed maritime operations and expeditionary advanced base operations. [1] The unit was based out of Marine Corps Base Camp Lejeune , North Carolina and fell under the command of the 2nd Marine Logistics Group (2d MLG) and the II ...
2d Landing Support Battalion: Marine Corps Base Camp Lejeune, North Carolina: 3d Landing Support Battalion: Landers Camp Foster, Okinawa: Supply battalions.
When the bit numbering starts at zero for the least significant bit (LSb) the numbering scheme is called LSb 0. [1] This bit numbering method has the advantage that for any unsigned number the value of the number can be calculated by using exponentiation with the bit number and a base of 2. [2] The value of an unsigned binary integer is therefore