Question

The base of ∆ABC is 6 and height is 4 while the base of ∆PQR is 12 and height is 8 .Then the ratio A(∆ABC)=A(∆POR)=​

Answer 1

Answer:

1:4

Step-by-step explanation:

its very easy

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Answer 2

Answer:

Solution:

Solution:perimeter of∆ABC/perimeter of∆PQR = 1st side of ∆ABC/2nd side of ∆PQR

Solution:perimeter of∆ABC/perimeter of∆PQR = 1st side of ∆ABC/2nd side of ∆PQR35/45=7/9

Solution:perimeter of∆ABC/perimeter of∆PQR = 1st side of ∆ABC/2nd side of ∆PQR35/45=7/9Now , we know that The ratio of two similar triangles are equal to the square of ratio of there corresponding sides

Solution:perimeter of∆ABC/perimeter of∆PQR = 1st side of ∆ABC/2nd side of ∆PQR35/45=7/9Now , we know that The ratio of two similar triangles are equal to the square of ratio of there corresponding sides(7/9) square = 49:81 ans

Step-by-step explanation:

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