If the reciprocal of a is itself, the absolute value of b is 3, and the opposite number of c is 5. Find the value of algebra 4a-[2a2-(3b-4a+c)]. I think there's some way to solve it. If the inverse of a is itself, the absolute value of b is 3, and the inverse of c is 5. Find the value of the algebra 4a-[ the square of 2a-(3b-4a+c)]. (Wrong number) If the reciprocal of a is itself, the absolute value of b is 3, and the opposite number of c is 5. Find the value of algebra 4a-[2a2-(3b-4a+c)]. There seem to be some solutions. If the inverse of a is itself, the absolute value of b is 3, and the inverse of c is 5. Find the value of the algebra 4a-[ the square of 2a-(3b-4a+c)]. (Wrong number)

If the reciprocal of a is itself, the absolute value of b is 3, and the opposite number of c is 5. Find the value of algebra 4a-[2a2-(3b-4a+c)]. I think there's some way to solve it. If the inverse of a is itself, the absolute value of b is 3, and the inverse of c is 5. Find the value of the algebra 4a-[ the square of 2a-(3b-4a+c)]. (Wrong number) If the reciprocal of a is itself, the absolute value of b is 3, and the opposite number of c is 5. Find the value of algebra 4a-[2a2-(3b-4a+c)]. There seem to be some solutions. If the inverse of a is itself, the absolute value of b is 3, and the inverse of c is 5. Find the value of the algebra 4a-[ the square of 2a-(3b-4a+c)]. (Wrong number)

A =+1 or -1, b =-3 or +3, c =-5
2 When a=1 b=3 c=-5
2 When a=-1 b=3 c=-5
-16 When a=1 b=-3 c=-5
-16 When a=-1 b=-3 c=-5
So values are 2 and -16.

Definition of ratio?

The definition of ratio is to take the form of ratio when defining a physical quantity. The physical concept defined by ratio occupies a considerable proportion in physics, such as velocity, density, pressure, power, specific heat capacity, calorific value, etc.