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49:33 For S1 :Define f(x) = e^cos(x) - e^2022sin(x) and use IVP as f(0)>0 and f(π)0It's not easy to think because the Q. is rotated 😮
Yours is good too, but I guess S2 is easy too with my approach, at last we can show that log(e^x+1/x) will be beaten by x
48:10 , integer part of -0.5 is -1. For option D, set is singleton {1} I think
Great approach in last question sir, it definitely improve logics, good
SIR AAP PLEASE CAMERA KO BOARD SE THODA DUR KR DE DIJYE PROBLEM AATI H
Thank you so much sir
Thanks for the support
Since Q is dense in R and can we use identity theorem fx is zero
But my function is not zero on rationals na
Function is identity function
Thankyou sir 🙏
Most welcome 🙏
DO LIKE AND SUBSCRIBE IF YOU LIKE OUR SOLUTIONS😃😃
49:33 For S1 :
Define f(x) = e^cos(x) - e^2022sin(x) and use IVP as f(0)>0 and f(π)0
It's not easy to think because the Q. is rotated 😮
Yours is good too, but I guess S2 is easy too with my approach, at last we can show that log(e^x+1/x) will be beaten by x
48:10 , integer part of -0.5 is -1. For option D, set is singleton {1} I think
Great approach in last question sir, it definitely improve logics, good
SIR AAP PLEASE CAMERA KO BOARD SE THODA DUR KR DE DIJYE PROBLEM AATI H
Thank you so much sir
Thanks for the support
Since Q is dense in R and can we use identity theorem fx is zero
But my function is not zero on rationals na
Function is identity function
Thankyou sir 🙏
Most welcome 🙏