Answer: Equation : 4ln(4)*x – y – 4{ln(4)-1} = 0 Step-by-step explanation: y = 4^x The slope of the tangent to a curve at any point is determined by differentiating it w.r.t x, dy/dx = (4^x)’ dy/dx = (4^x)*ln(4) m = dy/dx | (1,4) = (4^1)*ln(4) = 4ln(4) The tangent passes through (1,4), thus the equation (in one-point form) is : (y – 4) = 4ln4(x – 1) y – 4 = 4ln(4)*x – 4ln(4) 4ln(4)*x – y – 4ln(4) + 4 = 0 4ln(4)*x – y – 4{ln(4)–1} = 0 Reply
Answer:
Equation : 4ln(4)*x – y – 4{ln(4)-1} = 0
Step-by-step explanation:
y = 4^x
The slope of the tangent to a curve at any point is determined by differentiating it w.r.t x,
dy/dx = (4^x)’
dy/dx = (4^x)*ln(4)
m = dy/dx | (1,4) = (4^1)*ln(4) = 4ln(4)
The tangent passes through (1,4), thus the equation (in one-point form) is :
(y – 4) = 4ln4(x – 1)
y – 4 = 4ln(4)*x – 4ln(4)
4ln(4)*x – y – 4ln(4) + 4 = 0
4ln(4)*x – y – 4{ln(4)–1} = 0