Fate/Apocrypha Blu-ray Media Review Episode 11

Time for a change of venue!

All fights upon the battlefield will be experiencing an interruption. Berserker of Red was successfully baited onto Ruler, though keeping him focused proved impossible. He’s also ran into the duel between Sabers. However, Saber of Red isn’t playing around with him. After splitting him in two, he’s ready to blow everything away. The oppressors will finally be wiped out, but so will many innocents. In order to save everyone, Ruler has displayed a taste of her power. Now, while all these fights were taking place, the Red faction has been slowly advancing to their goal. Their floating citadel has made its way over the Fortress of Millennia. Buried deep within the earth, the Greater Grail has sat there for decades. In a spectacular show of force, they’ve stolen the Greater Grail right in front their eyes. This was not a move Darnic could of ever anticipated, nonetheless, he’ll command his forces into the sky. They’ve taking what is rightfully his, and he’s willing to do anything to get it back.

The home turf advantage has been lost. Those on the Black were able to hold their own due to Lancer of Black’s legend. As long as they remained on land he once controlled in life, his power was absolute. However, the Hanging Gardens of Babylon is foreign territory. Vlad III’s power may be weaken, but there’s more to this man’s legacy. He’s known by a much more famous name these days, Dracula. A name he detests with every fiber of his being, yet it will soon be one he’ll hear. Darnic has no choice moving forward. If he is to win this war, then a promise must be broken. The vampire is coming out whether he likes it or not. Anyhow, the climax of this night will soon be upon us. Enjoy the end of another Berserker!

 

 

WebMs:

 

Click here for the 11th webm collection.

 

One more until we finally complete this long journey. Join us next Monday for the betrayal!

Leave a Reply

Your email address will not be published. Required fields are marked *

four × two =