Consider the curve y=x2+3x+5. (a) Find the slope of the secant line to the curve through the points P=(4,33) and Q=(4+h,(4+h)2+3(4+h)+5). The slope of the secant line is . (b) Use your answer from part (a) to find the slope of the curve at the point P. The slope of the curve at P is . (c) Write an equation of the tangent line to the curve at P. The equation of the tangent line at P is y= .

Answer:a) The slope of the secant line is 11 + hb) The slope of the curve at P is 11c) The equation of the tangent line at P is y = 11x - 11Step-by-step explanation:y=x²+3x+5(a) Find the slope of the secant line to the curve through the points P=(4,33) and Q=(4+h,(4+h)²+3(4+h)+5)(4+h)²+3(4+h)+5 = 16 + 8h + h² + 12 + 3h + 5 = 33 + 11h + h²slope (m) = yq - yp/xq - xp → m = 33 + 11h + h² - 33/4 + h - 4m = 11h + h²/h = h(11+h)/h = 11 + hThe slope of the secant line is 11 + h(b) Use your answer from part (a) to find the slope of the curve at the point P.As P (4,33) = (4+0, 33+0) at P h is 0, so the slope at P is 11 + 0 = 11The slope of the curve at P is 11(c) Write an equation of the tangent line to the curve at P. y - yp = m(x - xp) → y - 33 = 11(x - 4) → y - 33 = 11x - 44 → y = 11x - 11The equation of the tangent line at P is y = 11x - 11