Three Circles and a Tangent Three Circles and
- Slides: 29
Three Circles and a Tangent
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent
Three Circles and a Tangent Returning to our problem:
Three Circles and a Tangent
RESOURCES
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Three Circles and a Tangent SIC_48 The three circles are touching and share a common tangent. The radii of the two larger circles are as stated in the diagram - all units are cm. (Not to scale)
Internal tangent vs external tangent
Theorems on angles formed by tangents and secants
Internal tangent vs external tangent
External tangent
Line that is tangent to two coplanar circles
Disequity
Three circles analysis
Graph of cotangent
Angles formed by secants and tangents
Sine, cosine, and tangent
Practice 11-1 tangent lines
Secant of a circle
Tangent period
Secants, tangents, and angle measures
Domain and range of secant function
Graph y=csc(x)
Use properties of tangents
The derivative and the tangent line problem
The tangent and velocity problems
Classification of engineering curves
Engineering curves
General equation of cone
Integrals involving powers of secant and tangent
Ratio for tangent
What is the ratio for tangent
Tangent planes and normal lines
Vertical tangent line
Common internal tangent
Hypotenuse/opposite
Trig ratios worksheet
