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Examples of the the word, tangent , in a Sentence Context

The word ( tangent ), is the 17295 most frequently used in English word vocabulary

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  1. The circleand these tangent s are equal in length. *If a tangent at A and a, tangent ,at B intersect at the exterior point, then denoting the center as, the angles ∠
  2. Space at x. Typically, the co tangent space is defined as the dual space of the, tangent ,space at x, although there are more direct definitions (see below). The
  3. Then × = ×. (Corollary of the tangent -secant theorem. ) *The angle between a, tangent ,and chord is equal to one half the subtended angle on the opposite side of the
  4. Such as algebraic geometry, an asymptote is defined as a line which is, tangent ,to a curve at infinity. The word asymptote is derived from the Greek asymptotes
  5. 1713. They appear in the Taylor series expansions of the tangent and hyperbolic, tangent ,functions, in the Euler–MacLaurin formula, and in expressions for certain
  6. Manifold of twice the dimension, the co tangent bundle of the manifold. The, tangent ,space and the co tangent space at a point are both real vector spaces of the
  7. In it. The first of these results is apparent by considering, for instance,the, tangent ,function, which provides a one-to-one correspondence between the interval (−½π
  8. Angle of rotation. The grade of a slope, or gradient is equal to the, tangent ,of the angle, or sometimes the sine. Gradients are often expressed as a
  9. Of odd size are enumerated by the Euler numbers of odd index (also called, tangent ,numbers) and the alternating permutations of even size by the Euler numbers of
  10. Let M be a smooth manifold and let x be a point in M. Let Tom be the, tangent ,space at x. Then the co tangent space at x is defined as the dual space of Tom::
  11. At (1,1) determines the value of and the result is that the equation of the, tangent ,is: (x_1-a)x+ (y_1-b)y = (x_1-a)x_1+ (y_1-b)y_1 or: (x_1-a) (x-a)+ (
  12. Tensor is used to define the angle between two tangent s. Where U and V are, tangent ,vectors and gig are the components of the metric tensor G, : \cos \theta = \franc
  13. By some 1800 years. His application of reference lines, a diameter and a, tangent ,is essentially no different from our modern use of a coordinate frame, where
  14. Is any convex polygon within which a circle can be inscribed that is, tangent ,to each side of the polygon. A cyclic polygon is any convex polygon about which
  15. The asymptotes of an algebraic curve in the affine plane are the lines that are, tangent ,to the objectivized curve through a point at infinity. Asymptotes are often
  16. Through. If (1,1) and the circle has centred (, ) and radius, then the, tangent ,line is perpendicular to the line from (, ) to (1,1),so it has the form (
  17. Tangent lines at all other values of x. In particular the graph has vertical, tangent ,lines at all points in the set \_. Moreover, F\left (x\right)\ge0 for all x
  18. When h equals zero:: \LIM_. Geometrically, the derivative is the slope of the, tangent ,line to the graph of f at a. The tangent line is a limit of secant lines just
  19. Of the body in circular motion, due to the body's linear momentum at a, tangent ,to the circle. Relation to relativity After completing his theory of special
  20. Endpoints lie on the circle. A diameter is the longest chord in a circle. A, tangent ,to a circle is a straight line that touches the circle at a single point, while
  21. Depending on the conditions to which it has been exposed. The notched rear, tangent ,iron sight is adjustable, and is calibrated in hundreds of meters. The front
  22. Speed of travel along the path, and: \math bf_\math rm = \franc \, a unit vector, tangent ,to the path pointing in the direction of motion at the chosen moment in time.
  23. Metric or a symplectic form gives rise to a natural isomorphism between the, tangent ,space and the co tangent space at a point, associating to any tangent convector a
  24. Below). The elements of the co tangent space are called co tangent vectors or, tangent ,convectors. Properties All co tangent spaces on a connected manifold have the
  25. Triangle a unique circle, called the encircle, can be inscribed such that it is, tangent ,to each of the three sides of the triangle. About every triangle a unique
  26. When the center of the circle is at the origin then the equation of the, tangent ,line becomes: x_1x+y_1y = r^2,and its slope is: \franc = -\franc. Properties
  27. New spaces. In each of the above cases, the functor sends each space to its, tangent ,bundle, and it sends each function to its derivative. There is one requirement
  28. Chord theorem states that if two chords, and,intersect at, then × = ×. *If a, tangent ,from an external point meets the circle at and a secant from the external point
  29. Inverse tangent function for all points except the origin, assuming the inverse, tangent ,varies from -π/2 to π/2,: \theta (x, y)=\beginning (y/x)quadrant\ I\\tank (
  30. D-orbitals for n = 3 look similar, each with four pear-shaped lobes, each lobe, tangent ,to two others, and the centers of all four lying in one plane, between a pair
  31. The tangent space and the co tangent space at a point, associating to any, tangent ,convector a canonical tangent vector. Formal definitions Definition as linear
  32. Given circle by tracing a fixed point on a smaller circle that rolls within and, tangent ,to the given circle. Circle as limiting case of other figures The circle can be
  33. From the point of tangency are the abscissas, and the segments parallel to the, tangent ,and intercepted between the axis and the curve are the ordinates. He further
  34. Y/x one can define the angle θ as a function of x and y using the inverse, tangent ,function for all points except the origin, assuming the inverse tangent varies
  35. Line perpendicular drawn to a radius through the end point of the radius is a, tangent ,to the circle. *A line drawn perpendicular to a tangent through the point of
  36. A horizontal tangent for the arc tangent when x tends to −∞, and is a horizontal, tangent ,for the arc tangent when x tends to +∞. Functions may lack horizontal asymptotes
  37. Of the radius is a tangent to the circle. *A line drawn perpendicular to a, tangent ,through the point of contact with a circle passes through the center of the
  38. To have a direct definition of the co tangent space without reference to the, tangent ,space. Such a definition can be formulated in terms of equivalence classes of
  39. Then denoting the center as, the angles ∠ and ∠ are supplementary. *If is, tangent ,to the circle at and if is a chord of the circle, then ∠ = \tracer ().
  40. Any point outside the circle, and these tangent s are equal in length. *If a, tangent ,at A and a tangent at B intersect at the exterior point, then denoting the
  41. x) -\pi/2 and \LIM_\arc tan (x) \pi/2. So the line is a horizontal, tangent ,for the arc tangent when x tends to −∞, and is a horizontal tangent for the
  42. Lengths are made equal for the lines C and F. In the neighborhood of 550 nm the, tangent ,to the curve is parallel to the axis of wave-lengths; and the focal length
  43. His Ar's Conjectandi of 1713. They appear in the Taylor series expansions of the, tangent ,and hyperbolic tangent functions, in the Euler–MacLaurin formula, and in
  44. The derivative is the slope of the tangent line to the graph of f at a. The, tangent ,line is a limit of secant lines just as the derivative is a limit of difference
  45. The co tangent space at a point, associating to any tangent convector a canonical, tangent ,vector. Formal definitions Definition as linear functional Let M be a smooth
  46. Then the orientation of C is chosen so that a vector \script style\math bf, tangent ,to C is positively oriented if and only if \script style\ forms a positively
  47. Deflected from pointing North when a current flowed in an adjacent wire. The, tangent ,galvanometer was used to measure currents using this effect, where the
  48. Values x where the series converges, and that the graph of F (x) has vertical, tangent ,lines at all other values of x. In particular the graph has vertical tangent
  49. A generalized circle is either a (true) circle or a line. Tangent lines The, tangent ,line through a point on the circle is perpendicular to the diameter passing
  50. Lim_ \\ &=\LIM_ \\ &=\LIM_ \\ &=\LIM_ (6 + h) \\ &= 6. \end The slope of, tangent ,line to the squaring function at the point (3,9) is 6,that is to say, it is

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