2) Find the maximum and minimum values of f(x) when f(x)= (x²-7x+6)/(x -10). Also obtained the values of x for which f(x) becomes maximum or minimum. MX at 4 mx.v is 1, mn at 16 mn v is 25
3) For what a value of x will (x-1)(3-x) have its maximum ? 2
4) Show that the maximum value of the function x+ 1/x is less than its minimum value.
5) Find the maximum value of f(x)¹⁾ˣ. e¹⁾ᵉ
6) Find the maximum minimum value of x³ + 1/x³. -2, 2
7) find the value of x for who is the function x⁴- 8x³+ 22x² - 24x+5 is maximum and minimum. Find also the maximum and the minimum value of the function. MX at 2 MX.v is -3, mn at 1 mn.v is -4
8) Find so that the function has neither maximum prove that the greatest rectangle inscribed in a circle is a square so that of all the tang given area the square as the lift perimeter obtain the maximum minimum value of the function in the interval the perimeter of the triangle is 8 cm find the length of the other side so that the area of the triangle is 100 cm is the area language A particle moving in straight line starts from the rest is the acceleration the particle time t or abr positive to constant then prove that the maximum velocity of the particle age what will be the radius of the base of a solid cylinder of volume 16 Pi Peru is a total surface area will be the smallest so that the all rectangles of a given perimeter the square as the greatest area give an xy is 4 and find the maximum minimum values of 4x + 9 Y divide 10 into two parts such that the product of a maximum find the maximum value of the product up to number the space is describing time T by a particle moving in a state line is given by find the minimum value of acceleration straight line its distance x from a fixed point over anytime trees given by the relation find the co-ordinate of a point on the parabola which is nearest to the straight line the parabola why find the point of least distance from the straight line the particle was the state line described distance x cm from a fixed point of the line at MTC can we wear find its acceleration in environment acceleration find the point on the straight line which is closest to the origin the coordinate of the required points 12 13 18 13 for what value of the function 2 sin x Cos 2x at else maximum and minimum values if a log has its extreme values find the value of PNB prove that the extreme Sur minimum a line is drawn rectangular maximum area is inscrib in a triangle is base is an altitude age find the area of the rectangle rectangle of British area is inscrib in a semicircle of radius a find its dimension so that the radius of the height right circular cylinder of the greatest car surface which can be describing a given cone is half that at the cone
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