Answer:
Hence the length of line segment BA as 98 units
Step-by-step explanation:
Given:
BA as tangent to circle ,DB as secant which intersect at point C at circle
Length BC= 55 and CD=120
To Find:
Length of line segment AB.
Solution:
This follows the relationship between tangent and secant in circle terms as:
Consider as figure such that ,
AB as tangent , DB as secant C be point at circle
So secant total distance = DB=BC+CD =55+120=175
Using formula as ,
[tex]AB^2=BC(BC+CD)[/tex]
We have to find AB
Here BC=55 and CD=120
[tex]AB^2=55(120+55)[/tex]
[tex]AB^2=55(175)[/tex]
[tex]AB^2=9625[/tex]
[tex]AB=98.10[/tex]
So nearest unit for length will be 98
Hence the length of line segment BA as 98 units
