Question

Is ( P = {1, 2, 3} ) and ( Q = (1,4 g) )? Then find ( sin(exQ) ), and then evaluate the following relations: ( 2 R P - Q ) defined by is equal to ( -2 P Q ) defined by a square of Be e o desingbo sa se in.

a) (sin(exQ) = {0.8415, -0.7568, -0.2794}), (2 R P - Q = {(1, -1), (2, -2), (3, -3)}), (-2 P Q = {(-2, -8), (-4, -16), (-6, -24)})
b) (sin(exQ) = {0.8415, -0.7568, -0.2794}), (2 R P - Q = {(1, -2), (2, -4), (3, -6)}), (-2 P Q = {(-2, -8), (-4, -16), (-6, -24)})
c) (sin(exQ) = {0.8415, -0.7568, -0.2794}), (2 R P - Q = {(1, -1), (2, -2), (3, -3)}), (-2 P Q = {(-2, -6), (-4, -12), (-6, -18)})
d) (sin(exQ) = {0.8415, -0.7568, -0.2794}), (2 R P - Q = {(1, -2), (2, -4), (3, -6)}), (-2 P Q = {(-2, -6), (-4, -12), (-6, -18)})

Answer 1

The given sets are P = {1, 2, 3} and Q = (1,4 g). To find sin(exQ), we need to evaluate sin of each element in Q. However, the value of g is not provided, so we cannot determine the exact values of sin(exQ). Then, we evaluate the relations 2 R P - Q and -2 P Q.

Step-by-step explanation:

The given sets are:

P = {1, 2, 3}

Q = (1,4 g)

To find sin(exQ), we need to evaluate sin of each element in Q.

sin(exQ) = {sin(1), sin(4), sin(g)}

However, the value of g is not provided, so we cannot determine the exact values of sin(exQ).

Now, let's evaluate the relations:

2 R P - Q = {(2-1, 2-4), (2-2, 2-4), (2-3, 2-4)} = {(1, -2), (0, -2), (-1, -2)}

-2 P Q = {(-2*1, -2*4), (-2*2, -2*4), (-2*3, -2*4)} = {(-2, -8), (-4, -8), (-6, -8)}