Grade 10 Quizzes, Questions & Answers
Recent Grade 10 Quizzes
Ready to apply the SOHCAHTOA ratios to find missing sides, angles, and distances? This quiz emphasizes practical problem-solving using trigonometric functions with both numeric and algebraic inputs. You will practice converting...
Questions: 20 | Attempts: 10 | Last updated: Jan 22, 2026
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Sample QuestionIn right triangle ABC with right angle at C, if sin(A) = 3/5, what is cos(A)?
Connect mathematics to real-life scenarios involving slopes, elevations, and viewing angles. In this quiz, you will apply an inverse tangent to determine angles of elevation, depression, and incline in problems involving...
Questions: 20 | Attempts: 17 | Last updated: Jan 22, 2026
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Sample QuestionA ship is 500 m from a 100 m cliff. Find the angle of elevation to the top of the cliff (nearest tenth).
Ready to explore how the arctangent (arctan) function links slopes, ratios, and angles. This quiz focuses on evaluating arctan values, identifying the correct principal range (–π/2 to π/2), and interpreting what each...
Questions: 20 | Attempts: 14 | Last updated: Jan 22, 2026
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Sample QuestionEvaluate arctan(1) in radians.
Apply arcsin to realistic situations — from ramps, ladders, and waves to motion and design problems. You’ll model physical relationships like θ = arcsin(opposite / hypotenuse) and interpret what each solution...
Questions: 20 | Attempts: 12 | Last updated: Jan 22, 2026
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Sample QuestionA cable exerts tension T = 800 N at angle θ, producing a vertical component Tᵥ = 400 N. Find θ in degrees.
Ready to turn sine equations into angles? This quiz helps you use arcsin to solve equations of the form sin(x) = k, identify principal values, and interpret additional solutions where appropriate. You’ll practice evaluating...
Questions: 20 | Attempts: 31 | Last updated: Jan 22, 2026
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Sample QuestionSolve for x (principal value): sin(x) = 1/2.
Turn graphs into stories. You’ll explain what the vertical shift means in context (average temperature, center height, baseline level), compute ranges, and compare models that share shape but sit at different...
Questions: 20 | Attempts: 10 | Last updated: Jan 22, 2026
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Sample QuestionThe function y = sin(x) + 4 is a vertical translation of y = sin(x). What is the midline of the new function?
Build equations that sit at the right height. You’ll translate specs like “midline at y = −3” or “max at 7, min at −1” into clean sine or cosine formulas with the correct vertical...
Questions: 20 | Attempts: 10 | Last updated: Jan 22, 2026
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Sample QuestionThe function y = −2 sin(4x) − 5 is formed by shifting y = −2 sin(4x). What is the shift, and how does it affect amplitude?
How far did the graph slide? This quiz is all about spotting horizontal shifts quickly. You’ll rewrite equations to a clean “shifted” form and decide whether a graph moved left or right—and by how...
Questions: 20 | Attempts: 10 | Last updated: Jan 22, 2026
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Sample QuestionWhat is the phase shift of y = sin(x − π/3)?
Make sense of scenarios that rise and fall around an average level. You’ll interpret domain restrictions (where secant is undefined), connect the period to timing, and explain how vertical stretches and shifts affect the...
Questions: 20 | Attempts: 10 | Last updated: Jan 22, 2026
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Sample QuestionWhich identity correctly defines the secant function?
Use cotangent to describe repeating changes in the real world. You’ll compare periods, decide when a horizontal compression or shift is needed, and choose equations that capture the timing, baseline, and shape you see in...
Questions: 21 | Attempts: 11 | Last updated: Jan 22, 2026
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Sample QuestionWhich equation matches Graph A in the figure?
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