Centering Intervals about a point | Thomas Calculus| Exercise 2.3| Q4-6. Lecture in Hindi/Urdu.

The questions discussed in this lecture video are: In Exercises 1–6, sketch the interval (a, b) on the x-axis with the point c inside. Then find a value of delta ＞ 0 such that for all x, 0 ＜ | x - c | ＜delta implies a ＜ x ＜ b. 1. a = 1 , b=7 , c=5 2. a = 1 , b=7 , c=2 3. a = -7/2 , b=-1/2 , c=-3 4.a = -7/2 , b=-1/2 , c=-3/2 5.a = 4/9 , b=4/7 , c=1/2 6.a = 2.7591 , b=3.2391 , c=3 This lecture video is about: 1)Thomas calculus exercise 2.3 solution 2) Question 4 to 6 solution 3) Centering intervals about a point 4) Important solved problems 5) Centering intervals about a point Thomas Calculus #thomascalculus #calculus #CenteringIntervalsaboutaPoint #CenteringIntervals #graphs #graphbehaviour #graphstructure #FindLimits #limits #thomascalculussolution