32,767
65,535
131,071
none
You asked this same question yesterday!!!
The sum does not exist
None
You're asking the same question again? well here is a copy paste
It is divergent because the terms are increasing rather than decreasing.
The sum is uncountably infinite
example:
1
+2 =3
+4 =7
+8 =15
+16 =31
+32 =63
+64 =127
+128 =255
+256 =511
+512 =1023
+1024 =2047
+2048 =4095
+4096 =8191
+8192 =16383
+16384 =32767
+32768 =65535
+65536 =131071
+131072 =262143
+262144 =524287
+524288 =1048575
+1048576 =2097151
+2097152 =4194303
+4194304 =8388607
+8388608 =16777215
+16777216 =33554431
+33554432 =67108863
+67108864 =134217727
+134217728 =268435455
+268435456 =536870911
+536870912 =1073741823
+1073741824 =2147483647
+2147483648 =4294967295
+4294967296 =8589934591
+8589934592 =17179869183
+17179869184 =34359738367
+34359738368 =68719476735
+68719476736 =1.37E+11
+1.37439E+11 =2.75E+11
+2.74878E+11 =5.50E+11
+5.49756E+11 =1.10E+12
It's already way past your choices thus 'none' is your only option
The given series does not converge, since common ratio, r = 2. Infinite geometric series converges only if I r I < 1
dude , mecheng2030 is right , you already asked this...
answer: none
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Answers & Comments
Verified answer
You asked this same question yesterday!!!
The sum does not exist
None
You're asking the same question again? well here is a copy paste
It is divergent because the terms are increasing rather than decreasing.
The sum is uncountably infinite
example:
1
+2 =3
+4 =7
+8 =15
+16 =31
+32 =63
+64 =127
+128 =255
+256 =511
+512 =1023
+1024 =2047
+2048 =4095
+4096 =8191
+8192 =16383
+16384 =32767
+32768 =65535
+65536 =131071
+131072 =262143
+262144 =524287
+524288 =1048575
+1048576 =2097151
+2097152 =4194303
+4194304 =8388607
+8388608 =16777215
+16777216 =33554431
+33554432 =67108863
+67108864 =134217727
+134217728 =268435455
+268435456 =536870911
+536870912 =1073741823
+1073741824 =2147483647
+2147483648 =4294967295
+4294967296 =8589934591
+8589934592 =17179869183
+17179869184 =34359738367
+34359738368 =68719476735
+68719476736 =1.37E+11
+1.37439E+11 =2.75E+11
+2.74878E+11 =5.50E+11
+5.49756E+11 =1.10E+12
It's already way past your choices thus 'none' is your only option
The given series does not converge, since common ratio, r = 2. Infinite geometric series converges only if I r I < 1
dude , mecheng2030 is right , you already asked this...
answer: none