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61 Consider a relation whose graph in the Cartesian xy plane looks like Fig FE-9 What can we say about this relation (a) It has no inverse (b) It s a function of x, but not y (c) It s a function of y, but not x (d) It s a function of both x and y (e) It s identical to its inverse
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y 6 All four sides of the graph 4 2 ( 4, 0) 6 4 2 2 4 6 are straight line segments 2 (4, 0) x 4 6 (0, 4) Graph of relation
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Figure FE-9
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Illustration for Question 61
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62 We can uniquely identify a plane in Cartesian three-space if we know (a) the locations of two points in the plane (b) the direction of a vector normal to the plane (c) the location of a point in the plane, and the direction of a vector normal to the plane (d) the direction of a vector in the plane (e) the direction numbers of a line that passes through the plane and the coordinate origin 63 Which of the following functions has an inverse that s also a function when we allow x to span the entire set of real numbers (a) f1 (x) = x 5 + 2 (b) f2 (x) = 3x 4 1 (c) f3 (x) = sin x (d) f4 (x) = x 2 + 10 (e) f5 (x) = tan x + 3 64 Consider the sum of twice the secant and twice the cosecant Let f (q) = 2 sec q + 2 csc q The range of f is (a) the set of all real numbers (b) the set of all positive real numbers (c) the set of all real numbers except those in the interval [ 1,1] (d) the set of all real numbers except those in the interval [ 2,2] (e) the set of all real numbers except those in the interval [ p,p ] 65 Figure FE-10 illustrates a parabola in the Cartesian xy plane, along with the generalized standard equation for that type of curve Based on the information shown, we know that (a) c > 0, because the curve has an absolute maximum (b) b = 0, because the curve s axis is vertical (c) c < 0, because the x-value of the curve s vertex point is negative (d) a < 0, because the curve opens downward (e) a = 0, because the curve doesn t turn any sharp corners 66 Imagine a double right circular cone, through which a flat plane passes Suppose that the plane has a Cartesian coordinate xy coordinate grid drawn on it Which of the following equations cannot, under any circumstances, represent the intersection of the plane and the cone (a) x 2 + y 2 = 4 (b) 3x 2 4y 2 = 12 (c) y = x 3 2x 2 + 1 (d) y = 3x (e) x2/4 + y 2/9 = 1
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Figure FE-10
Illustration for Question 65
67 In Fig FE-11, line L is a good portrayal of the graph of (a) the product of the natural exponential function and its reciprocal (b) the sum of the natural exponential function and its reciprocal (c) the difference between the natural exponential function and its reciprocal (d) the natural exponential function divided by its reciprocal (e) the reciprocal of the natural exponential function divided by the natural exponential function 68 In Fig FE-11, curve C is a good portrayal of the graph of (a) the product of the natural exponential function and its reciprocal (b) the sum of the natural exponential function and its reciprocal (c) the difference between the natural exponential function and its reciprocal (d) the natural exponential function divided by its reciprocal (e) the reciprocal of the natural exponential function divided by the natural exponential function 69 A relation that s both one-to-one and onto is known as (a) a surjection (b) a bijection (c) a monojection (d) an injection (e) a superjection
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