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The graph of function 
h is shown below. Let 
g(x)=int_(-4)^(x)h(t)dt.
Evaluate 
g(-1).

g(-1)=

The graph of function h h is shown below. Let g(x)=4xh(t)dt g(x)=\int_{-4}^{x} h(t) d t .\newlineEvaluate g(1) g(-1) .\newlineg(1)= g(-1)=

Full solution

Q. The graph of function h h is shown below. Let g(x)=4xh(t)dt g(x)=\int_{-4}^{x} h(t) d t .\newlineEvaluate g(1) g(-1) .\newlineg(1)= g(-1)=
  1. Identify Integral: Identify the integral to evaluate: g(1)=41h(t)dtg(-1) = \int_{-4}^{-1} h(t) \, dt.
  2. Graph Analysis: Look at the graph of h(t)h(t) to determine the area under the curve from 4-4 to 1-1.
  3. Assume Known Shape: Since the graph isn't provided, assume it's a known shape or has known values.

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