Given that the point (8, 3) lies on the graph of g(x) = log2x, which point lies on the graph of f(x) = log2(x + 3) + 2?
Given That The Point (8, 3) Lies On The Graph Of G(X) = Log2X, Which Point Lies On The Graph Of F(X) = Log2(X + 3) + 2?
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Given That The Point (8, 3) Lies On The Graph Of G(X) = Log2X, Which Point Lies On The Graph Of F(X) = Log2(X + 3) + 2?. To simplify the given expression as a polynomial,. The transformation of the point (8,3) from g(x) = log2 x results in the point (5,5) on the graph of f (x) = log2(x − 3) + 2.
Solved 8. Graph f(x)=2x and g(x)=log2x in the same from www.chegg.com
It means that horizontal shift towards left. The transformation of the point (8,3) from g(x) = log2 x results in the point (5,5) on the graph of f (x) = log2(x − 3) + 2. This is obtained by transforming the given point (8, 3) from the function g(x) by shifting left 3 units and up 2 units.
Shift 3 Units To The Left, Shift 2 Units Upwards Answer:
Therefore, the correct answer is option b. Shift 3 units to the left, shift 2 units upwards. Addition of 2 to the function value it means a vertical shift upwards by 2 units.
This Is Obtained By Transforming The Given Point (8, 3) From The Function G(X) By Shifting Left 3 Units And Up 2 Units.
It means that horizontal shift towards left. So, the points of [tex]f (x) = log2 (x + 3) + 2 [/tex] are [tex] (5,5) [/tex]. To simplify the given expression as a polynomial,.
The Transformation Of The Point (8,3) From G(X) = Log2 X Results In The Point (5,5) On The Graph Of F (X) = Log2(X − 3) + 2.
Hence, we can say that the point lies on the graph of [tex]f (x) = log2 (x + 3) + 2 [/tex] will lie on [tex] (5,5). Click here 👆 to get an answer to your question ️. Therefore, the answer is option a:
Ie, Point Will Also Be Shifted 3 Units To The Left.
