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Page 1 Edurev123 3. Singularity 3.1 Determine all entire functions ?? (?? ) such that 0 is a removal singularity of ?? ( ?? ?? ) . (2017 : 10 Marks) Solution: For any complex valued function, ?? (?? ) ?? (?? )=?? 8 ?? =0 ?? ?? ?? ?? +?? 8 ?? =1 ?? ?? ?? -?? Since, ?? (?? ) is entire, so all ?? ?? are zero. ?? ?? (?? )?=?? 8 ?? =0 ??? ?? ?? ?? ?? ( 1 ?? )?=?? 8 ?? =0 ??? ?? ( 1 ?? ) ?? ?=?? 0 + ?? 1 ?? + ?? 2 ?? 2 +?. ?? ( 1 2 ) is a removable singularity. 3.2 Let ?? be an entire function whose Tayior series expansion with centre ?? =?? has infinitely many terms. Show that ?? =?? is an essential singularity of ?? ( ?? ?? ) . [2021 : 15 marks] Solution: Let ?? (?? ) be an entire function whose Taylor series expansion with centre ?? =0 has infinitely many terms. Clearly, ?? (?? )=?? ?? is an entire function and its Taylor's series expansion with centre ?? =0 has infinitely many terms, i.e., We have ?? (?? )=?? ?? =1+?? + ?? 2 2! + ?? 3 3! +?. ?? h?????? ??????????????????????????????????????????? ( 1 ?? )=?? 1/?? Page 2 Edurev123 3. Singularity 3.1 Determine all entire functions ?? (?? ) such that 0 is a removal singularity of ?? ( ?? ?? ) . (2017 : 10 Marks) Solution: For any complex valued function, ?? (?? ) ?? (?? )=?? 8 ?? =0 ?? ?? ?? ?? +?? 8 ?? =1 ?? ?? ?? -?? Since, ?? (?? ) is entire, so all ?? ?? are zero. ?? ?? (?? )?=?? 8 ?? =0 ??? ?? ?? ?? ?? ( 1 ?? )?=?? 8 ?? =0 ??? ?? ( 1 ?? ) ?? ?=?? 0 + ?? 1 ?? + ?? 2 ?? 2 +?. ?? ( 1 2 ) is a removable singularity. 3.2 Let ?? be an entire function whose Tayior series expansion with centre ?? =?? has infinitely many terms. Show that ?? =?? is an essential singularity of ?? ( ?? ?? ) . [2021 : 15 marks] Solution: Let ?? (?? ) be an entire function whose Taylor series expansion with centre ?? =0 has infinitely many terms. Clearly, ?? (?? )=?? ?? is an entire function and its Taylor's series expansion with centre ?? =0 has infinitely many terms, i.e., We have ?? (?? )=?? ?? =1+?? + ?? 2 2! + ?? 3 3! +?. ?? h?????? ??????????????????????????????????????????? ( 1 ?? )=?? 1/?? ???????????????????????????????????????????????????? ( 1 ?? )=1+ 1 ?? + 1 2! · 1 ?? 2 + 1 3! · 1 ?? 3 +?. Clearly, the principal part of Laurent's series contains infinitely many terms. ??? =0 is an essential singular point.Read More
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FAQs on Singularity - Mathematics Optional Notes for UPSC
| 1. What is the concept of Singularity in the context of UPSC exam preparation? |  |
Ans. Singularity in the context of UPSC exam preparation refers to the point where artificial intelligence surpasses human intelligence, potentially leading to significant changes in the way candidates study and approach the exam.
| 2. How can Singularity impact the future of UPSC exams? | |
Ans. Singularity can impact the future of UPSC exams by potentially revolutionizing the way candidates access study materials, prepare for the exam, and even the format of the exam itself, through the integration of advanced technologies like AI.
| 3. What are some ways in which Singularity can enhance the effectiveness of UPSC exam preparation? | |
Ans. Singularity can enhance the effectiveness of UPSC exam preparation by providing personalized study plans, real-time feedback on performance, access to vast amounts of data and information, and even virtual tutoring or mentoring.
| 4. Are there any potential challenges or drawbacks associated with the concept of Singularity in UPSC exam preparation? | |
Ans. Some potential challenges or drawbacks associated with Singularity in UPSC exam preparation include concerns about data privacy, over-reliance on technology, potential biases in AI algorithms, and the need for candidates to adapt to new learning methods.
| 5. How can candidates stay updated with the latest advancements in Singularity and its impact on UPSC exams? | |
Ans. Candidates can stay updated with the latest advancements in Singularity and its impact on UPSC exams by following reputable sources in the field of artificial intelligence, attending relevant workshops or seminars, and actively engaging in discussions and forums related to the topic.
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Nov 21, 2024 Last updated |
Document Description: Singularity for UPSC 2024 is part of Mathematics Optional Notes for UPSC preparation.
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