A P P _ T I T L E = L G   W e b c a m   M o n i t o r 
 
 T _ R E C O R D = 2;u
 
 T _ R E C O R D S T O P = 2;u\Pbk
 
 T _ R E C O R D I N G = 2;u-N
 
 T _ H E L P = 000
 
 T _ S N A P S H O T = 00000000
 
 T _ O P E N F O L D E R = 00000O0
 
 T _ F O R W A R D C A M = 0000000
 
 T _ B A C K W A R D C A M = 00000
 
 T _ P R E V I E W = 00000
 
 T _ P R E V I E W S T O P = 0000\Pbk
 
 T _ C L O S E = X00
 
 T _ N O _ F R E E S P A C E = 0000n0OX[g0M000000L0
NW0f0D0~0Y0. 2;uo0\PbkU00~0Y0. 
 
 T _ P R E V E N T _ S A V E = 00000-No0000000000000J00s0{}000o0_jW0~0[00. 
 
 T _ O K = O K 
 
 T _ C O N F I R M = O K 
 
 T _ C A N C E L = 00000
 
 T _ N O _ D E V I C E = _jhVL0d0K00~0[00. 
 
 T _ F O L D E R _ S E T T I N G = OX[0000-[
 
 T _ I M A G E _ P A T H = 0000OX[00
 
 T _ M O V I E _ P A T H = 000OX[00
 
 T _ S E A R C H _ P A T H = 0000
 
 T _ V I D E O S O U R C E = 000-[
 
 T _ V I D E O F O R M A T = P^h0_jhV-[
 
 T _ S A V E F O L D E R = OX[000-[Y00
 
 T _ R E S O L U T I O N = P^
 
 T _ V I D E O D E V I C E = 000_jhV
 
 T _ A U D I O D E V I C E = 00000_jhV
 
 T _ S T O P R E C _ E R R = 2;u-No0000000\Pbkg0M0~0[00. 
 
 T _ P R E V I E W _ E R R = 000o0s(W{0K0n000000L0O(u-Ng0Y0. 
 
 T _ P R E V I E W _ E R R 2 = O(uMRk00000Oc0_0000000B}NW0f0O0`0U0D0. 
 
 T _ N O V I D E O _ D R V = P C 000L0d0K00~0[00. 
 
 T _ N O _ H E L P F I L E = 0000000n0000L0d0K00~0[00. 
 
 T _ S W I T C H _ E R R = 2;u-No0000n0R0fH0L0g0M0~0[00. 
 
 T _ E X I T R E C _ E R R = 2;u-Ng0Y002;u0B}NW0f0K00O(uW0f0O0`0U0D0. 
 
 T _ S E T T I N G = -[