b) $\left(A D^{\prime}, B^{\prime} C\right)=90^{\circ}$

Q: b) $\left(A D^{\prime}, B^{\prime} C\right)=90^{\circ}$

A. True B. False <figure class="image"><img src="https://docdn.giainhanh.io/media/test/deab09dc00634f1445d79a4513f0928a.png" alt="image.png" srcset="https://docdn.giainhanh.io/media/test/deab09dc00634f1445d79a4513f0928a.png 230w" sizes="100vw" width="230"></figure>Ta có: $B C^{\prime} / / A D^{\prime}$ nên $\left(A D^{\prime}, B^{\prime} C\right)=\left(B C^{\prime}, B^{\prime} C\right)=90^{\circ}$.Ta có: $B C^{\prime} / / A D^{\prime}$ nên $\left(A D^{\prime}, D C^{\prime}\right)=\left(B C^{\prime}, D C^{\prime}\right)=\widehat{B C^{\prime} D}$ Ta có: $\triangle B C^{\prime} D$ đều nên $\widehat{B C^{\prime} D}=60^{\circ}$.

Question

Accepted Answer

A. True
B. False

Ta có: $B C^{\prime} / / A D^{\prime}$ nên $\left(A D^{\prime}, B^{\prime} C\right)=\left(B C^{\prime}, B^{\prime} C\right)=90^{\circ}$.

Ta có: $B C^{\prime} / / A D^{\prime}$ nên $\left(A D^{\prime}, D C^{\prime}\right)=\left(B C^{\prime}, D C^{\prime}\right)=\widehat{B C^{\prime} D}$

Ta có: $\triangle B C^{\prime} D$ đều nên $\widehat{B C^{\prime} D}=60^{\circ}$.

Đề thi giữa kì 2 (Cấu trúc mới) - Đề số 74 - MĐ 11246