A. W(z) + R(z) + 3 is an antiderivative of w(z) +r(x). B. W(r) + R(z) is an antiderivative of w(z) + r(r) + 3. C. cos(W (z)) is an antiderivative of sin(w(r)) D. ew(=) is an antiderivative of...

Suppose that w and r are continuous functions on (−∞, ∞), W (x) is an invertible antiderivative of w(x), and R(x) is an antiderivative of r(x). Circle all of the statements that must be true.

A. W(z) + R(z) + 3 is an antiderivative of w(z) +r(x).<br>B. W(r) + R(z) is an antiderivative of w(z) + r(r) + 3.<br>C. cos(W (z)) is an antiderivative of sin(w(r))<br>D. ew(=) is an antiderivative of w(z)e(=),<br>E. eR(e) is an antiderivative of r(r)e).<br>r(r)<br>F. If w is never zero, then W-(R(z)) is an antiderivative of<br>w(W-(R(z))

Extracted text: A. W(z) + R(z) + 3 is an antiderivative of w(z) +r(x). B. W(r) + R(z) is an antiderivative of w(z) + r(r) + 3. C. cos(W (z)) is an antiderivative of sin(w(r)) D. ew(=) is an antiderivative of w(z)e(=), E. eR(e) is an antiderivative of r(r)e). r(r) F. If w is never zero, then W-(R(z)) is an antiderivative of w(W-(R(z))"

Jun 04, 2022

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A. W(z) + R(z) + 3 is an antiderivative of w(z) +r(x). B. W(r) + R(z) is an antiderivative of w(z) + r(r) + 3. C. cos(W (z)) is an antiderivative of sin(w(r)) D. ew(=) is an antiderivative of...

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