Graph plotting techniques in calculus
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- เผยแพร่เมื่อ 28 ม.ค. 2025
- Buy JEE Maths video lectures : Call 07814166606, 0172-4280095, Visit our website www.tewanimaths... Prof. Ghanshyam Tewani is author of many books on IITJEE mathematics published by worlds one of the most renowned publisher CENGAGE LEARNING. These books are appreciated all over INDIA and abroad. These books are now one of the top selling books in INDIA. Some books authored by Prof. Ghanshyam Tewani are 1. Algebra 2. Coordinate Geometry 3. Trigonometry 4. Calculus 5. Vectors and 3-D Geometry Prof. Ghanshyam Tewani has experience of 15 years for training students in Mathematics for IITJEE and other competitive examinations. He has worked for four years for FIITJEE Ltd., Delhi , the renowned name in IITJEE coaching. He is a rare genius, acknowledged as one of the best national level teachers in mathematics. His intense and concise lectures are aimed at clearing the student's fundamental concepts in mathematics and at the same time, laying a strong foundation for better understanding of complex problems. A man of uncommon devotion, he leaves no stone unturned to help out needy and deserving students. Every single word he speaks is weighed, for he believes in precision. In his own words, "For me each student counts, each one must learn to the best of his / her capability." Being a perfectionist, he doesn't tolerate even a minor error. It is not surprising that the best & most brilliant of student community hold him as their ideal and an adored mentor. Our Mission To develop a strong base with deeper understanding, and strengthen theoretical and applied dimensions of mathematics. To equip the students with a set of conceptual skills, intuitive tricks and fast methods to make them more confident and consequently expel the baseless fear of mathematics. (Buy iitjee videos : Call 07814166606, 0172-4280095, Visit our website www.tewanimaths.com)
Baaki teachers padha dete Hain...But you sir...U invoke ideas within us...Thanks a lottt
Sir aapka last video bhi shandaar tha
10:35 Sir there is one root for k= -1/e also
Also 1 root for k=0
Graphs just solve everything
Sir, how to find the range of f(x)=(sinx)^2 + 4 (cosecx)^2,.........Why fail here, AM-GM inequality Concept. Please, elaborate
where it is applicable.
I love Mathematics!
Wait what?
@@Gym_MaazTERyes, is it really that unbelievable to you?
@@neevhingrajia3822now I too🙂
Was searching for thia topic only thank u sir
No.of point of discontinuity and non differentiability of (arcsinx)+(arccosx) where (.) =g I f
Sir you are God of mathematics
Thanks Sir for detailed Explanation,
But Sir, how to recognize for more than two terms AM>=GM Concept is applicable or not
eg, [1]f(x)= 4 (sinx)^2 + (cosecx)^2 +2
[2] g(x)= 3^x +3^(-x) +8
[3] h(x)=2x+4x^3 + x^(-4) where, x>0
[4] f(x)=6^x + 3^x +6^(-x)+3^(-x) +2
All are positive terms so obv applicable though I guess it won't help now 🙃
For x e^x=k to have a single solution, I think k=(0,infinity)U{-1/e}
Just curious to know where are you broo.... Jee aspirant... I think now you hv already done you bachelor's... If this comment finds you ...make sure to reply
Sir, in the graph of x^x, I think there will be no point of inflection after x=1/e or I'm unable to find it.
As f''(x) >0 ¥ x>0.
Pls tell.
For 1 root why it's not [0,infinity)union{-1/e}
in any trangle ABC 2sinB=cosA ,the length of internal bisector is 2√2÷3. and the equation 25.cos^2(A-B)+ x^2+40cos(A-B)-2x+17=0 has at least one solution then what is the circumradius pls give me answer
Of angle C
Pls sir give me answer
Sir,
What will be the Range of f(x)=(sinx)/x ?
(0, 1)
Just curious to know where are you broo.....I think now you hv already done your bachelor's... If this comment finds you... Please make sure to reply.
In the frist question
Hume kaise pata chalega ki graph negative X se atee atee niche turn karega phir origin se pass hoke Infinity pe chala jayega
A lot of Thanks Sir....,
Sir, how to get exact value of c ,involved in your explanation for the Range of f(x)=(sinx)/x
Thank you very much, Sir...
Thanks Sir for detailed Explanation,
But Sir, how to recognize for more than two terms AM>=GM Concept is applicable or not
eg, [1]f(x)= 4 (sinx)^2 + (cosecx)^2 +2
[2] g(x)= 3^x +3^(-x) +8
[3] h(x)=2x+4x^3 + x^(-4) where, x>0
[4] f(x)=6^x + 3^x +6^(-x)+3^(-x) +2
Sir next on parabola
sir isliye hi aapki books best hain for IIT jee preparation
Thankx for such advance videos
Sir plz make videos on jee advanced 2020
What was your result?
Gr8 sir
sir plz upload lec other than available on cengage app
.....
truth teller is this available on cengage app
yes login with code given on book
Sir range how
Range would be -1 to infinity including-1
@@8796205190 range means the corresponding y coordinates of the least value and max value of x co-ordinate respectively. For -1 you get f(x)= y=-1/e and f(infinity) =y=infinity
What software you used sir
Sir are you author of Cengage Mathematics???
Yes
Sir point of inflection ka answer not defined hai if this true plz tell sir
Sir vo graph niche kyo gaya
First like
does anybody know which technology sir is using curus to know
Any reference book for maths where solution are given.
G Tewani Sir book
Cengage Mathematics
Underrated 🫡
Sir board ka bahar aaja koi kuch nahi kahega
Thanks Sir for detailed Explanation,
But Sir, how to recognize for more than two terms AM>=GM Concept is applicable or not
eg, [1]f(x)= 4 (sinx)^2 + (cosecx)^2 +2
[2] g(x)= 3^x +3^(-x) +8
[3] h(x)=2x+4x^3 + x^(-4) where, x>0
[4] f(x)=6^x + 3^x +6^(-x)+3^(-x) +2
Just curious to know where are you broo.... Jee aspirant... I think now you hv already done you bachelor's... If this comment finds you ...make sure to reply