# Nakafa Framework: LLM URL: https://nakafa.com/en/exercises/high-school/snbt/quantitative-knowledge/try-out/set-7/2 Exercises: Try Out - Set 7: Real exam simulation to sharpen your skills and build confidence. - Question 2 --- ## Exercise 2 ### Question export const metadata = { title: "Question 2", authors: [{ name: "Nabil Akbarazzima Fatih" }], date: "12/24/2025", }; Given , the equation of the tangent line at the point with abscissa is... ### Choices - [ ] $$y = 2x - 4$$ - [ ] $$y = -2x - 2$$ - [ ] $$y = -2x + 4$$ - [x] $$y = 2x + 12$$ - [ ] $$y = -2x + 12$$ ### Answer & Explanation export const metadata = { title: "Question 2 Explanation", authors: [{ name: "Nabil Akbarazzima Fatih" }], date: "12/24/2025", }; Given the function . We want to find the equation of the tangent line at the point with abscissa . #### Finding the Ordinate Substitute into the curve equation: So, the point of tangency is . #### Finding the Gradient of the Tangent Line The gradient of the tangent line is the value of the first derivative at the abscissa of the point of tangency. Substitute : #### Determining the Equation of the Tangent Line Use the point-slope form for the equation of a line passing through with gradient : Substitute , , and : Thus, the equation of the tangent line is . ---