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Jawaban dan Penjelasan
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Jawaban:
Input
2 sin^352(°)
Exact result
2 sin^352(π/180)
Decimal approximation
2.717077840378352237285401071488336915487379903282003866146... × 10^-619
Continued fraction
[0; 3680424554420385370952391207582968996729089663400515473986235, ...]
Alternative representations
2 sin^352(1 °) = 2 (1/csc(1 °))^352
2 sin^352(1 °) = 2 cos^352(-° + π/2)
2 sin^352(1 °) = 2 (-cos(1 ° + π/2))^352
Series representations
2 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k °^(1 + 2 k))/((1 + 2 k)!))^352
2 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k (1 ° - π/2)^(2 k))/((2 k)!))^352
2 sin^352(1 °) = 18347988927920572092886567162416695526372519913346248989900710715095383008707878464560148424881005492436992 ( sum_(k=0)^∞ (-1)^k J_(1 + 2 k)(°))^352
Integral representations
2 sin^352(1 °) = 2 °^352 ( integral_0^1 cos(° t) dt)^352
2 sin^352(1 °) = ( integral_(-i ∞ + γ)^(i ∞ + γ) ((°/2)^(1 - 2 s) Γ(s))/Γ(3/2 - s) ds)^352/(4586997231980143023221641790604173881593129978336562247475177678773845752176969616140037106220251373109248 π^176) for 0<γ<1
2 sin^352(1 °) = (°^352 ( integral_(-i ∞ + γ)^(i ∞ + γ) e^(-°^2/(4 s) + s)/s^(3/2) ds)^352)/(42081087212386988057927919063041029324402718422585390875986247224549857234376646576909332290220707609815863750849425741704155458001470430905022518165215046799641789369027556785533310063074581738170346013886251008 π^176) for γ>0
by:Ken saka¶
![Jawaban:Input2 sin^352(°)Exact result2 sin^352(π/180)Decimal approximation2.717077840378352237285401071488336915487379903282003866146... × 10^-619Continued fraction[0; 3680424554420385370952391207582968996729089663400515473986235, ...]Alternative representations2 sin^352(1 °) = 2 (1/csc(1 °))^3522 sin^352(1 °) = 2 cos^352(-° + π/2)2 sin^352(1 °) = 2 (-cos(1 ° + π/2))^352Series representations2 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k °^(1 + 2 k))/((1 + 2 k)!))^3522 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k (1 ° - π/2)^(2 k))/((2 k)!))^3522 sin^352(1 °) = 18347988927920572092886567162416695526372519913346248989900710715095383008707878464560148424881005492436992 ( sum_(k=0)^∞ (-1)^k J_(1 + 2 k)(°))^352Integral representations2 sin^352(1 °) = 2 °^352 ( integral_0^1 cos(° t) dt)^3522 sin^352(1 °) = ( integral_(-i ∞ + γ)^(i ∞ + γ) ((°/2)^(1 - 2 s) Γ(s))/Γ(3/2 - s) ds)^352/(4586997231980143023221641790604173881593129978336562247475177678773845752176969616140037106220251373109248 π^176) for 0<γ<12 sin^352(1 °) = (°^352 ( integral_(-i ∞ + γ)^(i ∞ + γ) e^(-°^2/(4 s) + s)/s^(3/2) ds)^352)/(42081087212386988057927919063041029324402718422585390875986247224549857234376646576909332290220707609815863750849425741704155458001470430905022518165215046799641789369027556785533310063074581738170346013886251008 π^176) for γ>0by:Ken saka¶](https://id-static.z-dn.net/files/dd4/952d1f3c55d294baa64802f67ccc9c05.jpg)
![Jawaban:Input2 sin^352(°)Exact result2 sin^352(π/180)Decimal approximation2.717077840378352237285401071488336915487379903282003866146... × 10^-619Continued fraction[0; 3680424554420385370952391207582968996729089663400515473986235, ...]Alternative representations2 sin^352(1 °) = 2 (1/csc(1 °))^3522 sin^352(1 °) = 2 cos^352(-° + π/2)2 sin^352(1 °) = 2 (-cos(1 ° + π/2))^352Series representations2 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k °^(1 + 2 k))/((1 + 2 k)!))^3522 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k (1 ° - π/2)^(2 k))/((2 k)!))^3522 sin^352(1 °) = 18347988927920572092886567162416695526372519913346248989900710715095383008707878464560148424881005492436992 ( sum_(k=0)^∞ (-1)^k J_(1 + 2 k)(°))^352Integral representations2 sin^352(1 °) = 2 °^352 ( integral_0^1 cos(° t) dt)^3522 sin^352(1 °) = ( integral_(-i ∞ + γ)^(i ∞ + γ) ((°/2)^(1 - 2 s) Γ(s))/Γ(3/2 - s) ds)^352/(4586997231980143023221641790604173881593129978336562247475177678773845752176969616140037106220251373109248 π^176) for 0<γ<12 sin^352(1 °) = (°^352 ( integral_(-i ∞ + γ)^(i ∞ + γ) e^(-°^2/(4 s) + s)/s^(3/2) ds)^352)/(42081087212386988057927919063041029324402718422585390875986247224549857234376646576909332290220707609815863750849425741704155458001470430905022518165215046799641789369027556785533310063074581738170346013886251008 π^176) for γ>0by:Ken saka¶](https://id-static.z-dn.net/files/daf/a6aa1822d84eef24d6bb6220e073b066.jpg)
![Jawaban:Input2 sin^352(°)Exact result2 sin^352(π/180)Decimal approximation2.717077840378352237285401071488336915487379903282003866146... × 10^-619Continued fraction[0; 3680424554420385370952391207582968996729089663400515473986235, ...]Alternative representations2 sin^352(1 °) = 2 (1/csc(1 °))^3522 sin^352(1 °) = 2 cos^352(-° + π/2)2 sin^352(1 °) = 2 (-cos(1 ° + π/2))^352Series representations2 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k °^(1 + 2 k))/((1 + 2 k)!))^3522 sin^352(1 °) = 2 ( sum_(k=0)^∞ ((-1)^k (1 ° - π/2)^(2 k))/((2 k)!))^3522 sin^352(1 °) = 18347988927920572092886567162416695526372519913346248989900710715095383008707878464560148424881005492436992 ( sum_(k=0)^∞ (-1)^k J_(1 + 2 k)(°))^352Integral representations2 sin^352(1 °) = 2 °^352 ( integral_0^1 cos(° t) dt)^3522 sin^352(1 °) = ( integral_(-i ∞ + γ)^(i ∞ + γ) ((°/2)^(1 - 2 s) Γ(s))/Γ(3/2 - s) ds)^352/(4586997231980143023221641790604173881593129978336562247475177678773845752176969616140037106220251373109248 π^176) for 0<γ<12 sin^352(1 °) = (°^352 ( integral_(-i ∞ + γ)^(i ∞ + γ) e^(-°^2/(4 s) + s)/s^(3/2) ds)^352)/(42081087212386988057927919063041029324402718422585390875986247224549857234376646576909332290220707609815863750849425741704155458001470430905022518165215046799641789369027556785533310063074581738170346013886251008 π^176) for γ>0by:Ken saka¶](https://id-static.z-dn.net/files/d35/5423e21990f1b5317fc66a56839fa11e.jpg)
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Last Update: Fri, 04 Nov 22