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Determine whether the relation defines y as a function of x. EXPLAIN YOUR ANSWER.
Determine whether the relation defines y as a function of x. Give the domain. y = √(5x - 7)
Determine if the relation defines y as a function of x. 2 4 -3 -1 2 Yes, this relation defines y as a function of x. No, this relation does not define y as a function of x.
Determine whether the following rule defines y as a function of x. x = y^2
Determine whether the equation defines y as a function of x. 20) y=+1/1 - 5x 21) y = 5x=1
4) Determine whether the following relation is an equivalence relation. Justify your answer. If the relation is an equivalence relation, then describe the partition defined by the equivalence classes. The domain is a group of people. Person x is related to person y under relation M if x and y have the same biological mother. You can assume that there is at least one pair in the group, x and y, such that xMy.
By justifying your answer, determine whether the function (, ) defines an inner product on V. (a) ((u1, U2, U3, U4), (V1, V2, 03, 04)) = U104 – 5u2 V3 and V = R4. (b) ((uj, u2), (01, 02)) = V2 U1V1 + u202 and V = R2.
By justifying your answer, determine whether the function 〈,〉 defines an inner product on V. (a) 〈(u1,u2,u3,u4),(v1,v2,v3,v4)〉=u1v4−5u2v3〈V=R4. (b) 〈(u1,u2),(v1,v2)〉=2–√u1v1+u2v2 V=R2. Please solve it in very detail, and make sure it is correct.
3 1 3 -4 (a) Write a set of ordered pairs (x, y) that defines the relation. (b) Write the domain of the relation. (c) Write the range of the relation. (d) Determine if the relation defines y as a function of x.
By justifying your answer, determine whether the function 〈,〉〈,〉 defines an inner product on VV. (a) 〈(u1,u2,u3,u4),(v1,v2,v3,v4)〉=u1v4−5u2v3〈(u1,u2,u3,u4),(v1,v2,v3,v4)〉=u1v4−5u2v3 and V=R4V=R4. (b) 〈(u1,u2),(v1,v2)〉=2–√u1v1+u2v2〈(u1,u2),(v1,v2)〉=2u1v1+u2v2 and V=R2V=R2.
The function, By justifying your answer, determine whether 7 defines an loner Product cas (cui nas Ws, un, (wu. Var Vauva) ) - Li. Wy - 5w, vg and Va " (b) Kuus), u. Nad >=V7 Live + us to and V=R*