Our approach will be to find the area of ∆ABC, then determine the fraction of that comprising ∆MNC. Multiplying the area of ∆ABC by that fraction will give the area of ∆MNC.
The area of a right triangle is half the product of the leg lengths. Then the area of ∆ABC is ...
... A = (1/2)(6 cm)(8 cm) = 24 cm²
The segment AB is divided into 3 parts having the ratios ...
... 1 : 2.5 : 1.5
where segment MN is the segment corresponding to 2.5 out of the total of 5 ratio units. That is, the length of MN is half the length of AB.
If we consider the "base" of ∆ABC to be segment AB, then the altitude of that triangle is the perpendicular distance from C to AB. We don't need to know what that altitude is. We just need to know that ∆MNC has the same altitude but half the base length of ∆ABC. Thus ∆MNC will have half the area of ∆ABC.
Area ∆MNC = (1/2) × (Area ∆ABC) = (1/2)(24 cm²)
Area ∆MNC = 12 cm²
