Thanks in advance
Simplify: (sin Θ − cos Θ) − (sin Θ + cos Θ)2

−sin2 Θ
−cos2 Θ
0
−2sin(Θ)cos(Θ) − cos(Θ) + sin(Θ) − 1

(sin O - cos O) - (sin O + cos O)^2
= sin O - cos O - (sin^2 O + cos^2 O + 2 sin O cos O)
= sin O - cos O - ( 1 + 2 sin O cos O)
Distributing the negative over the second set of parentheses:-
= sin O - cos O - 1 - 2 sin O cos O
= -2 sin O cos O - cos O + sin O - 1 (answer)

Its the last choice.

Answer Link

lisboa lisboa · Answer 2 · 2019-09-03T08:29:53+02:00

Answer:

−2sin(Θ)cos(Θ) − cos(Θ) + sin(Θ) − 1

Step-by-step explanation:

[tex](sin O - cos O) - (sin O + cos O)^2[/tex]

[tex](sin A + cos A)^2= sin^2A + cos^2A+2sinAcosA[/tex]

Apply identity, sin^2A+cos^2A= 1

[tex](sin O - cos O) - (sin O + cos O)^2[/tex]

Replace 1 for sin^2O+cos^2O= 1

[tex](sin O - cos O) - (sin O + cos O)^2[/tex]

[tex](sin O - cos O) -(1+2sin(O)cos(O))[/tex]

REmove the parenthesis and simplify if possible

[tex]sin O - cos O -1-2sin(O)cos(O))[/tex]

So option D is correct

Thanks in advance Simplify: (sin Θ − cos Θ) − (sin Θ + cos Θ)2 −sin2 Θ −cos2 Θ 0 −2sin(Θ)cos(Θ) − cos(Θ) + sin(Θ) − 1

Respuesta :

Otras preguntas

Thanks in advance
Simplify: (sin Θ − cos Θ) − (sin Θ + cos Θ)2

−sin2 Θ
−cos2 Θ
0
−2sin(Θ)cos(Θ) − cos(Θ) + sin(Θ) − 1