Final answer:
Yes, the function ()=−72 is a linear transformation.
Step-by-step explanation:
A linear transformation is a function that preserves the operations of vector addition and scalar multiplication. To determine if the function ()=−72 is a linear transformation, we need to check if it satisfies the properties of linearity:
In this case, let's check if the function satisfies these properties:
1. Property of Vector Addition:
Let's pick two random vectors, a and b:
a = 2
b = -3
Now, let's calculate the function applied to the sum of these vectors:
()=−72=−72 = -144
Now, let's calculate the sum of the function applied to each vector:
()+()=−72+(-72)=-144
Since the function satisfies the property of vector addition, let's move onto the second property.
2. Property of Scalar Multiplication:
Let's pick a random vector, a:
a = 5
Now, let's calculate the function applied to the scalar multiplication of this vector:
()=−72=−360
Now, let's calculate the scalar multiplication of the function applied to the vector:
=−72()=-72*5=-360
Since the function satisfies both properties of linearity, we can conclude that it is a linear transformation.