Answer:
[tex]AM=\frac{25}{7}[/tex]
Step-by-step explanation:
It is given that AC:CM = 3:4.
Therefore, let AC = 3k and CM = 4k
It is given that Δ ACM is right angled.
Therefore,
[tex]AM^{2} =AC^{2} +CM^{2}[/tex]
[tex]=(3k)^{2} +(4k)^{2}[/tex]
[tex]=9k^{2} +16k^{2}[/tex]
[tex]=25k^{2}[/tex]
AM = 5k
But, AM = MP + AP
Therefore, MP + AP = 5k --- (1)
It is given that MP - AP = 1 --- (2)
Multiply (1) and (2), we get.
(MP + AP)(MP - AP) = 5k × 1 = 5k
[tex]MP^{2} -AP^{2} =5k[/tex]
Add and subtract [tex]CP^{2}[/tex] on the left side.
[tex]MP^{2} + CP^{2} - CP^{2} -AP^{2} =5k[/tex]
[tex](MP^{2} + CP^{2}) - (CP^{2} +AP^{2}) =5k[/tex] --- (3)
But, since CP ⊥ AM, Δ CMP and Δ CAP are right triangles. Therefore,
[tex]MP^{2} +CP^{2} =CM^{2}[/tex] and
[tex]CP^{2} +AP^{2} =AC^{2}[/tex]
Now, (3) becomes,
[tex]CM^{2} -AC^{2} =5k[/tex]
[tex](4k)^{2} -(3k)^{2} =5k[/tex]
[tex]7k^{2} =5k[/tex]
7k = 5 or
[tex]k=\frac{5}{7}[/tex]
AM = 5k
[tex]=5(\frac{5}{7} )[/tex]
[tex]=\frac{25}{7}[/tex]
