Grade 11 Quizzes, Questions & Answers
Recent Grade 11 Quizzes
How can you evaluate common arcsin values with confidence? In this quiz, you’ll work through problems that focus on interpreting angles, recognizing familiar ratios, and connecting arcsin outputs to the unit circle....
Questions: 20 | Attempts: 11 | Last updated: Dec 17, 2025
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Sample QuestionSelect all true statements about arcsin compositions and values.
What makes inverse sine so unique compared to the regular sine function? In this quiz, you’ll explore how restricting sine’s domain creates a meaningful inverse, allowing angles to be recovered from known ratios....
Questions: 21 | Attempts: 12 | Last updated: Dec 17, 2025
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Sample QuestionIf x = sin(5π/6), then arcsin(x) = 5π/6.
How can you identify the exact phase shift from a trig equation? In this quiz, you’ll learn to read transformation parameters accurately, isolate the horizontal shift, and connect symbolic expressions to visual movement...
Questions: 20 | Attempts: 10 | Last updated: Dec 17, 2025
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Sample QuestionSelect all equations with a phase shift of π/8 to the right.
How do horizontal shifts affect sine and cosine graphs? In this quiz, you’ll explore how phase shifts translate wave patterns along the x-axis and change the timing of peaks, troughs, and midline crossings. You’ll...
Questions: 20 | Attempts: 11 | Last updated: Dec 17, 2025
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Sample QuestionIn y = cos(x − C), positive C shifts right.
Why does secant have such a distinctive range with excluded values? In this quiz, you’ll explore how secant’s relationship to cosine influences its allowed outputs and creates natural gaps in the graph....
Questions: 20 | Attempts: 10 | Last updated: Dec 17, 2025
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Sample QuestionSelect all correct implications of the range for graphing y = secθ.
What happens to secant between its vertical asymptotes? In this quiz, you’ll study how secant curves form separate branches, observe how they move away from cosine’s zeros, and interpret their growth on restricted...
Questions: 20 | Attempts: 10 | Last updated: Dec 16, 2025
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Sample QuestionThe points θ = kπ are local extrema of y = secθ (where defined).
How does cotangent repeat its behavior across the coordinate plane? In this quiz, you’ll explore cotangent’s periodic nature and discover how odd symmetry shapes its graph. You’ll analyze how repeating...
Questions: 20 | Attempts: 11 | Last updated: Dec 16, 2025
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Sample QuestionFor all θ where defined, cot(θ+π)=cotθ and cot(−θ)=−cotθ can both hold without contradiction.
What causes cotangent’s sign and slope to shift across the coordinate plane? In this quiz, you’ll explore how cotangent behaves within different quadrants, analyze intervals where it increases or decreases, and...
Questions: 20 | Attempts: 10 | Last updated: Dec 16, 2025
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Sample QuestionAs θ → 0^+, what is the behavior of cotθ?
How do domain, range, and vertical asymptotes reveal a function’s behavior? In this quiz, you’ll examine how restrictions arise, how outputs stretch or compress, and where asymptotes shape the graph’s...
Questions: 20 | Attempts: 12 | Last updated: Dec 16, 2025
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Sample QuestionThe set of zeros of y = tanθ is {θ = kπ | k ∈ ℤ}.
Curious about what the unit circle truly represents? In this quiz, you’ll explore how the circle’s geometry connects angles, coordinates, and trigonometric values. You’ll interpret key points, examine...
Questions: 20 | Attempts: 10 | Last updated: Dec 16, 2025
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Sample QuestionBetween any two consecutive vertical asymptotes, the graph of y = tanθ is strictly increasing.
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