AP Precalculus Score Calculator

The Mistake: Applying transformations in the wrong order or mixing up horizontal vs. vertical shifts, especially with expressions like f(x-3)+2 or understanding that f(2x) compresses horizontally by factor of 2, not stretches.

Example: Given f(x) = x², students incorrectly graph f(2(x-1))+3 by stretching instead of compressing, or applying horizontal shift before the compression, resulting in wrong position and shape.

How to Avoid: Memorize transformation order: horizontal shift → horizontal stretch/compress → vertical stretch/compress → vertical shift. Remember: inside parentheses affects x (horizontal), outside affects y (vertical). For f(bx), if |b|>1, it compresses horizontally by factor 1/b. Practice 10-15 transformation problems before exam, drawing each step. Make a reference card with transformation rules and their effects.

The Mistake: Incorrectly applying trig identities, confusing similar formulas like sin(2x) = 2sin(x)cos(x) with sin²(x) + cos²(x) = 1, or making sign errors in quadrants when evaluating trig functions.

Example: Simplifying sin²(x) as 2sin(x), or stating cos(π+x) = cos(x) instead of cos(π+x) = -cos(x), especially when working with phase shifts or solving equations.

How to Avoid: Create an identity reference sheet: Pythagorean identities, double-angle formulas, sum/difference formulas. Memorize which functions are positive in each quadrant (CAST rule: Cosine-All-Sine-Tangent). When using identities, write them out first before substituting values. Check answers by plugging in test values like π/4 or π/6 where trig values are known. Practice converting between different forms of the same expression.

The Mistake: Misapplying logarithm properties like log(a+b) ≠ log(a) + log(b), forgetting that logarithm arguments must be positive, or incorrectly applying change of base formula when solving equations.

Example: Simplifying log(x+1) - log(x) as log(1) = 0 instead of log((x+1)/x), or solving log(x-2) = 3 without checking that x>2 is required for valid domain.

How to Avoid: Memorize the three key log properties: log(ab) = log(a) + log(b), log(a/b) = log(a) - log(b), and log(aⁿ) = n·log(a). NEVER combine logs of sums/differences without quotient rule. Always write domain restrictions before solving log equations. After solving, check that solutions satisfy domain restrictions. Practice working problems both forward and backward to build intuition for when properties apply.

The Mistake: Calculating trig functions in degree mode when the problem uses radians (or vice versa), incorrectly entering fractions or parentheses in calculator, or misreading calculator output for angle measures.

Example: Evaluating sin(π/3) in degree mode gives sin(60°) ≈ 0.866, but calculator in degree mode reads π/3 ≈ 1.047° giving sin(1.047°) ≈ 0.018, completely wrong answer. Or entering 1/2x as (1/2)x when meaning 1/(2x).

How to Avoid: At start of exam, immediately check calculator mode - AP Precalculus typically uses RADIANS for trig problems unless explicitly stated otherwise. Set mode to radians and verify by checking sin(π/2) = 1. Use parentheses liberally when entering expressions, especially for fractions and negative numbers. For calculator sections, verify answers make intuitive sense - if sin(angle) shows 1.5, you made an error since sine has range [-1,1]. Practice entering complex expressions correctly during review sessions.