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Limitations of the theorem
Since a velocity gradient exists across the tube, the mean velocity of the liquid is to be considered. The viscous drag which comes into play when the liquid is in motion, is not taken into account. In above conservation principle, part of K.E. is converted into heat..
Definite Integral as a Limit of Sum
Definite Integral as a Limit of Sum - Let f be a continuous non-negative function defined on a closed interval [a, b]. Since the value of the function is non-negative, the graph of the function is a curve above X-axis. Let the graph of the curve be as shown in the figure.Let f b..
Definite Integral as a Limit of Sum - Let f be a continuous non-negative function defined on a closed interval [a, b]. Since the value of the function is non-negative, the graph of the function is a curve above X-axis. Let the graph of the curve be as shown in the figure.Let f b..Definite Integral as a Limit of Sum
The region under the centre bounded by X - axis, x = 1 and x = 3 is a trapezium, where area is given by (Since the area of the trapezium = base x (the sum of the parallel sides)) In all the three cases, we have seen that, the area of the regions are obtained by multiplying the base with a..
The region under the centre bounded by X - axis, x = 1 and x = 3 is a trapezium, where area is given by (Since the area of the trapezium = base x (the sum of the parallel sides)) In all the three cases, we have seen that, the area of the regions are obtained by multiplying the base with a..Definite Integral as a Limit of Sum
Let f (x) be a single valued continuous function defined in the interval [a,b] where b > 0 and let the interval [a,b] be divided into n equal parts each of length h, so that nh = b - a; then we define ..
Let f (x) be a single valued continuous function defined in the interval [a,b] where b > 0 and let the interval [a,b] be divided into n equal parts each of length h, so that nh = b - a; then we define ..Theorem
Sum of the angles of a triangle is equal to two right angle..
Theorem:
If x is a rational number, then the sum (e x ) of the exponential series..
If x is a rational number, then the sum (e x ) of the exponential series..Theorem
Theorem - Sum of the angles of a triangle is equal to two right angles. ABC is a triangle A + B + ACB = 180 o Produce BC to D. Through C draw CE || B..
Theorem - Sum of the angles of a triangle is equal to two right angles. ABC is a triangle A + B + ACB = 180 o Produce BC to D. Through C draw CE || B..Theorem Sum of the angles of a triangle is equal to two right angles. ABC is a triangle A + B + ACB = 180 o Produce BC to D. Through C draw CE || B..
Sum of the angles of a triangle is equal to two right angles. ABC is a triangle A + B + ACB = 180 o Produce BC to D. Through C draw CE || B..Limits (Contd....)
Limits of Trigonometric Functions and Sandwich Theorem: for all x in some open interval containing c and suppose Since f is sandwiched between two functions g and h, the above theorem is known as sandwich theorem..
Limits of Trigonometric Functions and Sandwich Theorem: for all x in some open interval containing c and suppose Since f is sandwiched between two functions g and h, the above theorem is known as sandwich theorem..Limits (Contd....) Limits of Trigonometric Functions and Sandwich Theorem: for all x in some open interval containing c and suppose ..
Limits of Trigonometric Functions and Sandwich Theorem: for all x in some open interval containing c and suppose ..See what our Users say :
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