For the Primary Horizontal Axis Title‚ select Title Below Axis. For the Primary Vertical Axis Title‚ select Rotated Title. Some charts have secondary axes; for such charts‚ select Title Below Axis as the Secondary Horizontal Axis Title and None as the Secondary Vertical Axis Title. Data Labels Select None. Data Table Select None. Axes For the Primary Horizontal Axis Title‚ select Show Left to Right Axis. For the Primary Vertical Axis Title‚ select Show Default Axis. Some charts have secondary
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moves away from the sensor. In the third graph‚ the acceleration moves from a larger value to a smaller value on the y axis and becomes closer to the x axis after the 3s mark when the object begins accelerating in the opposite direction. From all three graphs‚ it can be readily determined that the cart goes from a fast velocity-originating from the push start- to a slower one as the cart
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would exist between the joint axes if the joints were coincident‚ and it can be thought of as a rotation around the X axis. Thus‚ the type 2 link has one degree of translation and effectively two degrees of rotation. Type 3 link In this link‚ the second type of revolute joint in introduced. If joint n in the type 1 link is rotated 90o degrees about the Y axis so that the Z axis is collinear with the centre line of the link‚ we have the link configurationa shown. The significant difference between
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reference to the rotation axis of the Earth. The primary reference points are the poles where the axis of rotation of the Earth intersects the reference surface. Planes which contain the rotation axis intersect the surface in the meridians and the angle between any one meridian plane and that through Greenwich (the Prime Meridian) defines the longitude: meridians are lines of constant longitude. The plane through the centre of the Earth and orthogonal to the rotation axis intersects the surface in
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The Hindu temple: axis of access -Michael w.meister -Subhashree Nath 2nd year‚ USAP The Hindu temple‚ combines physically the pillar that marks the axis of cosmic parturition‚ the altar (square) of sacrifice taking the shape of the create universe‚ and the need for shelter of both the divinity and the worshipper; it unites the cosmic mountain and the potent cave. Before the advent of construction of stone temples in the 5th century AD‚ tree shrines and similar enclosures for objects of worship
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calculated to get an average. • The result will be proceeding with modification on design to adjust the SD card slot placing at the front cab panel. RESULT AND CALCULATION A data sample for the X-axis SD card slot Sample X 1 2 3 4 5 X=average R=range 1 4.26 4.13 4.06 4.34 4.39 4.236 0.33 2 4.43 4.40 4.43 4.23 4.42 4.382 0.2 3 4.30 4.27 4.28 4.46 4.41 4.344 0.19 4 4.57 4.12 4.42 4.46 4.45 4.404 0.45 5 4.36 4.42 4.28 4.38 4.34 4.356 0.14
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Symmetric about its axis) Right Equation Axis Figure y=0 Left y= 0 Upward x= 0 ) Downward x= 0 Focus (a‚ 0) (-a‚ 0) Vertex (0‚0) (0‚0) Latus 4a 4a Rectum Directrix x = -a x=a ELLIPSE ( Symmetric about both the axis) Equation Equation of the major axis Length of major axis Length of minor axis Vertices Foci Eccentricity Latus Rectum y=0 2a 2b ( a‚ 0) ( c‚ 0) (0‚ a) (0‚0) 4a y = -a (0‚ -a) (0‚0) 4a y =a x=0 2a 2b (0‚ a ) (0‚ c ) HYPERBOLA Equation Equation of the transverse axis Length of transverse
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curve‚ y2 = x‚ the lines‚ x = 1 and x = 4‚ and the x-axis is the area ABCD. Question 2: Find the area of the region bounded by y2 = 9x‚ x = 2‚ x = 4 and the x-axis in the first quadrant. ANSWER 1 www.cbse.entrancei.com cbse.entrancei.com The area of the region bounded by the curve‚ y2 = 9x‚ x = 2‚ and x = 4‚ and the x-axis is the area ABCD. Question 3: Find the area of the region bounded by x2 = 4y‚ y = 2‚ y = 4 and the y-axis in the first quadrant. ANSWER 2 www.cbse
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1. Two of your friends‚ Matt and Karen‚ both run to you to settle a dispute. They were working on a math problem‚ and got different answers. Wisely‚ you decide to look at their work to see if you can spot the source of confusion. Matt 6 – 4(3 – 5)2 + 30 ÷ 5 6 – 4(–2)2 + 30 ÷ 5 6 – 4(4) + 30 ÷ 5 6 – 16 + 30 ÷ 5 −10 + 30 ÷ 5 20 ÷ 5 4 Karen 6 – 4(3 – 5)2 + 30 ÷ 5 6 – 4(–2)2 + 30 ÷ 5 6 – 4(−4) + 30 ÷ 5 6 + 16 + 30 ÷ 5 6 + 16 + 6 22 + 6 28 Explain to Matt and Karen who‚ if either‚ is correct‚ and identify
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Pure Rotational Motion- in such a motion‚ a rigid body rotates about a fixed axis. Every particle of the body moves in a circle‚ which lies in a plane perpendicular to the axis‚ and has its centre on the axis. For e.g.‚ in an oscillating table fan or pedestal fan‚ the axis of rotation is horizontal. This axis has an oscillating sideways movement in a horizontal plane about the vertical through the point at which the axis is pivoted. (3) Combination Of Translational And Rotational Motion- for e.g
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