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Sophie Germain primes I discovered

Sophie Germain primes are in the form p and 2p+1 pairs where both are prime. So 3 and 7 are Sophie Germain primes.
Note if p = k*2^n + 1 then 2p + 1 = k*2^(n+1) + 3
Here follow some Sophie Germain primes that I discovered.

994537*2^10332 +1 and 994537*2^10333 +3

691195*2^10328 +1 and 691195*2^10329 +3

196931*2^10013 +1 and 196931*2^10014 +3

115105*2^10080 +1 and 115105*2^10081 +3

534599*2^10163 +1 and 534599*2^10164 +3

771007*2^10232 +1 and 771007*2^10233 +3

304205*2^10243 +1 and 304205*2^10244 +3

1005955*2^14086 +1 and 1005955*2^14087 +3

2791685*2^10011 +1 and 2791685*2^10012 +3

2095075*2^10033 +1 and 2095075*2^10033 +3

2499127*2^10076+1 and 2499127*2^10077+3

2811337*2^10140+1 and 2811337*2^10141+3

2950571*2^10155+1 and 2950571*2^10156+3

2025877*2^10184+1 and 2025877*2^10185+3

2975441*2^10237+1 and 2975441*2^10238+3

924989*2^14069+1 and 924989*2^14070+3

1447889*2^14155+1 and 1447889*2^14156+3

1284311*2^14171+1 and 1284311*2^14172+3

1096975*2^14226+1 and 1096975*2^14227+3

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