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📰 Solution: Let $ y = \sin(2x) $. The equation becomes $ y^2 + 3y + 2 = 0 $, which factors as $ (y + 1)(y + 2) = 0 $. Thus, $ y = -1 $ or $ y = -2 $. Since $ \sin(2x) $ ranges between $-1$ and $1$, $ y = -2 $ is invalid. For $ y = -1 $, $ \sin(2x) = -1 $ has infinitely many solutions (e.g., $ 2x = rac{3\pi}{2} + 2\pi k $, $ k \in \mathbb{Z} $). However, if restricted to a specific interval (not stated here), the count would depend on the domain. Assuming $ x \in \mathbb{R} $, there are infinitely many solutions. But if the question implies a general count, the answer is oxed{ ext{infinitely many}}. 📰 Question: Find the minimum value of $ (\cos x + \sec x)^2 + (\sin x + \csc x)^2 $. 📰 Solution: Expand the expression: $ \cos^2x + 2 + \sec^2x + \sin^2x + 2 + \csc^2x $. Simplify using $ \cos^2x + \sin^2x = 1 $ and $ \sec^2x = 1 + an^2x $, $ \csc^2x = 1 + \cot^2x $: $ 1 + 2 + 1 + an^2x + 1 + \cot^2x + 2 = 7 + an^2x + \cot^2x $. Let $ t = an^2x $, so $ \cot^2x = rac{1}{t} $. The expression becomes $ 7 + t + rac{1}{t} $. By AM-GM, $ t + rac{1}{t} \geq 2 $, so the minimum is $ 7 + 2 = 9 $. Thus, the minimum value is $ oxed{9} $. 📰 5 Times Square 4185785 📰 Free Games Scary 8841415 📰 This Simple Hoe Tool Changed My Kitchen Forever 8975244 📰 Dpw Dubai 7432895 📰 Zo Secrets That Will Change Your Life Forever 7093237 📰 Fortnite Survey Skins 7899377 📰 Nina Wayne 3103576 📰 Southwestern Adventist University 295957 📰 Courtney Kennedy Hill 6840382 📰 Great Games To Play 7525214 📰 Gunnerkrigg Shocked The World Heres What No One Talks About 9511564 📰 Inside The Wall Of United Concordia Secrets That Shock Every Fan 4193923 📰 Whos Actually Running Forever 21 The Hidden Ownership You Never Expected 7827960 📰 Truncate Clean Conquer The Secret Trim Function Everyone Uses In Excel 3790093 📰 Write Properties 3328204